Eigenvalues of linearized matrix around x = {+7.893219649794000e-01,+0.000000000000000e+00,+9.800000000000000e-02} 0 : (+3.042496252663142e-01 +0.000000000000000e+00*i) +1 : (-1.148496252663142e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.800000000000000e-02 Eigenvalues of linearized matrix around x = {+7.921308999692001e-01,+0.000000000000000e+00,+9.750000000000000e-02} 0 : (+3.073689343237345e-01 +0.000000000000000e+00*i) +1 : (-1.179689343237345e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.750000000000000e-02 Eigenvalues of linearized matrix around x = {+7.948409945180001e-01,+0.000000000000000e+00,+9.700000000000000e-02} 0 : (+3.103565245272631e-01 +0.000000000000000e+00*i) +1 : (-1.209565245272631e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.700000000000000e-02 Eigenvalues of linearized matrix around x = {+7.974614153255001e-01,+0.000000000000000e+00,+9.650000000000000e-02} 0 : (+3.132255957628988e-01 +0.000000000000000e+00*i) +1 : (-1.238255957628988e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.650000000000000e-02 Eigenvalues of linearized matrix around x = {+8.000000000000000e-01,+0.000000000000000e+00,+9.600000000000000e-02} 0 : (+3.159873471303772e-01 +0.000000000000000e+00*i) +1 : (-1.265873471303772e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.600000000000000e-02 Eigenvalues of linearized matrix around x = {+8.024635119008000e-01,+0.000000000000000e+00,+9.550000000000000e-02} 0 : (+3.186513720585682e-01 +0.000000000000000e+00*i) +1 : (-1.292513720585682e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.550000000000000e-02 Eigenvalues of linearized matrix around x = {+8.048578354204000e-01,+0.000000000000000e+00,+9.500000000000000e-02} 0 : (+3.212259590880812e-01 +0.000000000000000e+00*i) +1 : (-1.318259590880812e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.500000000000000e-02 Eigenvalues of linearized matrix around x = {+8.071881278819001e-01,+0.000000000000000e+00,+9.450000000000000e-02} 0 : (+3.237183243602572e-01 +0.000000000000000e+00*i) +1 : (-1.343183243602573e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.450000000000000e-02 Eigenvalues of linearized matrix around x = {+8.094589392775000e-01,+0.000000000000000e+00,+9.400000000000000e-02} 0 : (+3.261347937812145e-01 +0.000000000000000e+00*i) +1 : (-1.367347937812145e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.400000000000000e-02 Eigenvalues of linearized matrix around x = {+8.116743077988000e-01,+0.000000000000000e+00,+9.350000000000001e-02} 0 : (+3.284809475149177e-01 +0.000000000000000e+00*i) +1 : (-1.390809475149177e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.350000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.350000000000001e-02 Eigenvalues of linearized matrix around x = {+8.138378368812000e-01,+0.000000000000000e+00,+9.300000000000001e-02} 0 : (+3.307617358673499e-01 +0.000000000000000e+00*i) +1 : (-1.413617358673498e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.300000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.300000000000001e-02 Eigenvalues of linearized matrix around x = {+8.159527579559001e-01,+0.000000000000000e+00,+9.250000000000001e-02} 0 : (+3.329815731664363e-01 +0.000000000000000e+00*i) +1 : (-1.435815731664363e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.250000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.250000000000001e-02 Eigenvalues of linearized matrix around x = {+8.180219820211001e-01,+0.000000000000000e+00,+9.200000000000001e-02} 0 : (+3.351444145155162e-01 +0.000000000000000e+00*i) +1 : (-1.457444145155162e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.200000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.200000000000001e-02 Eigenvalues of linearized matrix around x = {+8.200481423740000e-01,+0.000000000000000e+00,+9.150000000000001e-02} 0 : (+3.372538190734357e-01 +0.000000000000000e+00*i) +1 : (-1.478538190734356e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.150000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.150000000000001e-02 Eigenvalues of linearized matrix around x = {+8.220336302885001e-01,+0.000000000000000e+00,+9.100000000000001e-02} 0 : (+3.393130026321051e-01 +0.000000000000000e+00*i) +1 : (-1.499130026321051e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.100000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.100000000000001e-02 Eigenvalues of linearized matrix around x = {+8.239806250097000e-01,+0.000000000000000e+00,+9.050000000000001e-02} 0 : (+3.413248816120741e-01 +0.000000000000000e+00*i) +1 : (-1.519248816120741e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.050000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.050000000000001e-02 Eigenvalues of linearized matrix around x = {+8.258911191347000e-01,+0.000000000000000e+00,+9.000000000000001e-02} 0 : (+3.432921101215491e-01 +0.000000000000000e+00*i) +1 : (-1.538921101215491e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.000000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.000000000000001e-02 Eigenvalues of linearized matrix around x = {+8.277669402186001e-01,+0.000000000000000e+00,+8.950000000000001e-02} 0 : (+3.452171113644536e-01 +0.000000000000000e+00*i) +1 : (-1.558171113644537e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.950000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.950000000000001e-02 Eigenvalues of linearized matrix around x = {+8.296097692690001e-01,+0.000000000000000e+00,+8.900000000000001e-02} 0 : (+3.471021044104390e-01 +0.000000000000000e+00*i) +1 : (-1.577021044104390e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.900000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.900000000000001e-02 Eigenvalues of linearized matrix around x = {+8.314211566598001e-01,+0.000000000000000e+00,+8.850000000000001e-02} 0 : (+3.489491271336204e-01 +0.000000000000000e+00*i) +1 : (-1.595491271336205e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.850000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.850000000000001e-02 Eigenvalues of linearized matrix around x = {+8.332025358916001e-01,+0.000000000000000e+00,+8.800000000000001e-02} 0 : (+3.507600559668529e-01 +0.000000000000000e+00*i) +1 : (-1.613600559668530e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.800000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.800000000000001e-02 Eigenvalues of linearized matrix around x = {+8.349552355438000e-01,+0.000000000000000e+00,+8.750000000000001e-02} 0 : (+3.525366229925019e-01 +0.000000000000000e+00*i) +1 : (-1.631366229925020e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.750000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.750000000000001e-02 Eigenvalues of linearized matrix around x = {+8.366804897008000e-01,+0.000000000000000e+00,+8.700000000000001e-02} 0 : (+3.542804307939995e-01 +0.000000000000000e+00*i) +1 : (-1.648804307939994e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.700000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.700000000000001e-02 Eigenvalues of linearized matrix around x = {+8.383794470837000e-01,+0.000000000000000e+00,+8.650000000000001e-02} 0 : (+3.559929654147742e-01 +0.000000000000000e+00*i) +1 : (-1.665929654147743e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.650000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.650000000000001e-02 Eigenvalues of linearized matrix around x = {+8.400531790787000e-01,+0.000000000000000e+00,+8.600000000000001e-02} 0 : (+3.576756077098450e-01 +0.000000000000000e+00*i) +1 : (-1.682756077098451e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.600000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.600000000000001e-02 Eigenvalues of linearized matrix around x = {+8.417026868208001e-01,+0.000000000000000e+00,+8.550000000000001e-02} 0 : (+3.593296433259666e-01 +0.000000000000000e+00*i) +1 : (-1.699296433259667e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.550000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.550000000000001e-02 Eigenvalues of linearized matrix around x = {+8.433289074648000e-01,+0.000000000000000e+00,+8.500000000000001e-02} 0 : (+3.609562715061562e-01 +0.000000000000000e+00*i) +1 : (-1.715562715061563e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.500000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.500000000000001e-02 Eigenvalues of linearized matrix around x = {+8.449327197556000e-01,+0.000000000000000e+00,+8.450000000000001e-02} 0 : (+3.625566128835896e-01 +0.000000000000000e+00*i) +1 : (-1.731566128835897e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.450000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.450000000000001e-02 Eigenvalues of linearized matrix around x = {+8.465149489900000e-01,+0.000000000000000e+00,+8.400000000000001e-02} 0 : (+3.641317164012534e-01 +0.000000000000000e+00*i) +1 : (-1.747317164012534e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.400000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.400000000000001e-02 Eigenvalues of linearized matrix around x = {+8.480763714501001e-01,+0.000000000000000e+00,+8.350000000000000e-02} 0 : (+3.656825654744837e-01 +0.000000000000000e+00*i) +1 : (-1.762825654744837e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.350000000000000e-02 Eigenvalues of linearized matrix around x = {+8.496177183752001e-01,+0.000000000000000e+00,+8.300000000000000e-02} 0 : (+3.672100834944506e-01 +0.000000000000000e+00*i) +1 : (-1.778100834944507e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.300000000000000e-02 Eigenvalues of linearized matrix around x = {+8.511396795297000e-01,+0.000000000000000e+00,+8.250000000000000e-02} 0 : (+3.687151387564130e-01 +0.000000000000000e+00*i) +1 : (-1.793151387564131e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.250000000000000e-02 Eigenvalues of linearized matrix around x = {+8.526429064155000e-01,+0.000000000000000e+00,+8.200000000000000e-02} 0 : (+3.701985488835879e-01 +0.000000000000000e+00*i) +1 : (-1.807985488835880e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.200000000000000e-02 Eigenvalues of linearized matrix around x = {+8.541280151726001e-01,+0.000000000000000e+00,+8.150000000000000e-02} 0 : (+3.716610848093341e-01 +0.000000000000000e+00*i) +1 : (-1.822610848093342e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.150000000000000e-02 Eigenvalues of linearized matrix around x = {+8.555955892020001e-01,+0.000000000000000e+00,+8.100000000000000e-02} 0 : (+3.731034743680304e-01 +0.000000000000000e+00*i) +1 : (-1.837034743680305e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.100000000000000e-02 Eigenvalues of linearized matrix around x = {+8.570461815451000e-01,+0.000000000000000e+00,+8.050000000000000e-02} 0 : (+3.745264055427471e-01 +0.000000000000000e+00*i) +1 : (-1.851264055427471e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.050000000000000e-02 Eigenvalues of linearized matrix around x = {+8.584803170449000e-01,+0.000000000000000e+00,+8.000000000000000e-02} 0 : (+3.759305294070244e-01 +0.000000000000000e+00*i) +1 : (-1.865305294070245e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.000000000000000e-02 Eigenvalues of linearized matrix around x = {+8.598984943133000e-01,+0.000000000000000e+00,+7.950000000000000e-02} 0 : (+3.773164627954010e-01 +0.000000000000000e+00*i) +1 : (-1.879164627954011e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.950000000000000e-02 Eigenvalues of linearized matrix around x = {+8.613011875259000e-01,+0.000000000000000e+00,+7.900000000000000e-02} 0 : (+3.786847907330309e-01 +0.000000000000000e+00*i) +1 : (-1.892847907330309e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.900000000000000e-02 Eigenvalues of linearized matrix around x = {+8.626888480623001e-01,+0.000000000000000e+00,+7.850000000000000e-02} 0 : (+3.800360686501637e-01 +0.000000000000000e+00*i) +1 : (-1.906360686501638e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.850000000000000e-02 Eigenvalues of linearized matrix around x = {+8.640619060071001e-01,+0.000000000000000e+00,+7.800000000000001e-02} 0 : (+3.813708244034708e-01 +0.000000000000000e+00*i) +1 : (-1.919708244034709e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.800000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.800000000000001e-02 Eigenvalues of linearized matrix around x = {+8.654207715267001e-01,+0.000000000000000e+00,+7.750000000000001e-02} 0 : (+3.826895601251984e-01 +0.000000000000000e+00*i) +1 : (-1.932895601251984e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.750000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.750000000000001e-02 Eigenvalues of linearized matrix around x = {+8.667658361336000e-01,+0.000000000000000e+00,+7.700000000000001e-02} 0 : (+3.839927539170300e-01 +0.000000000000000e+00*i) +1 : (-1.945927539170301e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.700000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.700000000000001e-02 Eigenvalues of linearized matrix around x = {+8.680974738497000e-01,+0.000000000000000e+00,+7.650000000000001e-02} 0 : (+3.852808614046740e-01 +0.000000000000000e+00*i) +1 : (-1.958808614046741e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.650000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.650000000000001e-02 Eigenvalues of linearized matrix around x = {+8.694160422780001e-01,+0.000000000000000e+00,+7.600000000000001e-02} 0 : (+3.865543171665698e-01 +0.000000000000000e+00*i) +1 : (-1.971543171665698e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.600000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.600000000000001e-02 Eigenvalues of linearized matrix around x = {+8.707218835912001e-01,+0.000000000000000e+00,+7.550000000000001e-02} 0 : (+3.878135360487270e-01 +0.000000000000000e+00*i) +1 : (-1.984135360487271e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.550000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.550000000000001e-02 Eigenvalues of linearized matrix around x = {+8.720153254455001e-01,+0.000000000000000e+00,+7.500000000000001e-02} 0 : (+3.890589143770795e-01 +0.000000000000000e+00*i) +1 : (-1.996589143770796e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.500000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.500000000000001e-02 Eigenvalues of linearized matrix around x = {+8.732966818257001e-01,+0.000000000000000e+00,+7.450000000000001e-02} 0 : (+3.902908310762206e-01 +0.000000000000000e+00*i) +1 : (-2.008908310762207e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.450000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.450000000000001e-02 Eigenvalues of linearized matrix around x = {+8.745662538285001e-01,+0.000000000000000e+00,+7.400000000000001e-02} 0 : (+3.915096487038280e-01 +0.000000000000000e+00*i) +1 : (-2.021096487038281e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.400000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.400000000000001e-02 Eigenvalues of linearized matrix around x = {+8.758243303887000e-01,+0.000000000000000e+00,+7.350000000000001e-02} 0 : (+3.927157144076682e-01 +0.000000000000000e+00*i) +1 : (-2.033157144076683e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.350000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.350000000000001e-02 Eigenvalues of linearized matrix around x = {+8.770711889542001e-01,+0.000000000000000e+00,+7.300000000000001e-02} 0 : (+3.939093608129673e-01 +0.000000000000000e+00*i) +1 : (-2.045093608129674e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.300000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.300000000000001e-02 Eigenvalues of linearized matrix around x = {+8.783070961133000e-01,+0.000000000000000e+00,+7.250000000000001e-02} 0 : (+3.950909068454014e-01 +0.000000000000000e+00*i) +1 : (-2.056909068454014e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.250000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.250000000000001e-02 Eigenvalues of linearized matrix around x = {+8.795323081785000e-01,+0.000000000000000e+00,+7.200000000000001e-02} 0 : (+3.962606584954343e-01 +0.000000000000000e+00*i) +1 : (-2.068606584954344e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.200000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.200000000000001e-02 Eigenvalues of linearized matrix around x = {+8.807470717309001e-01,+0.000000000000000e+00,+7.150000000000001e-02} 0 : (+3.974189095294530e-01 +0.000000000000000e+00*i) +1 : (-2.080189095294530e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.150000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.150000000000001e-02 Eigenvalues of linearized matrix around x = {+8.819516241286001e-01,+0.000000000000000e+00,+7.100000000000001e-02} 0 : (+3.985659421523203e-01 +0.000000000000000e+00*i) +1 : (-2.091659421523204e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.100000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.100000000000001e-02 Eigenvalues of linearized matrix around x = {+8.831461939801001e-01,+0.000000000000000e+00,+7.050000000000001e-02} 0 : (+3.997020276235453e-01 +0.000000000000000e+00*i) +1 : (-2.103020276235454e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.050000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.050000000000001e-02 Eigenvalues of linearized matrix around x = {+8.843310015887000e-01,+0.000000000000000e+00,+7.000000000000001e-02} 0 : (+4.008274268339053e-01 +0.000000000000000e+00*i) +1 : (-2.114274268339053e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.000000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.000000000000001e-02 Eigenvalues of linearized matrix around x = {+8.855062593666001e-01,+0.000000000000000e+00,+6.950000000000001e-02} 0 : (+4.019423908422942e-01 +0.000000000000000e+00*i) +1 : (-2.125423908422942e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.950000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.950000000000001e-02 Eigenvalues of linearized matrix around x = {+8.866721722244001e-01,+0.000000000000000e+00,+6.900000000000001e-02} 0 : (+4.030471613791340e-01 +0.000000000000000e+00*i) +1 : (-2.136471613791341e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.900000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.900000000000001e-02 Eigenvalues of linearized matrix around x = {+8.878289379353000e-01,+0.000000000000000e+00,+6.850000000000001e-02} 0 : (+4.041419713165131e-01 +0.000000000000000e+00*i) +1 : (-2.147419713165131e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.850000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.850000000000001e-02 Eigenvalues of linearized matrix around x = {+8.889767474771001e-01,+0.000000000000000e+00,+6.800000000000000e-02} 0 : (+4.052270451087477e-01 +0.000000000000000e+00*i) +1 : (-2.158270451087478e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.800000000000000e-02 Eigenvalues of linearized matrix around x = {+8.901157853538001e-01,+0.000000000000000e+00,+6.750000000000000e-02} 0 : (+4.063025992057566e-01 +0.000000000000000e+00*i) +1 : (-2.169025992057566e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.750000000000000e-02 Eigenvalues of linearized matrix around x = {+8.912462298972000e-01,+0.000000000000000e+00,+6.700000000000000e-02} 0 : (+4.073688424402528e-01 +0.000000000000000e+00*i) +1 : (-2.179688424402529e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.700000000000000e-02 Eigenvalues of linearized matrix around x = {+8.923682535516001e-01,+0.000000000000000e+00,+6.650000000000000e-02} 0 : (+4.084259763922517e-01 +0.000000000000000e+00*i) +1 : (-2.190259763922517e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.650000000000000e-02 Eigenvalues of linearized matrix around x = {+8.934820231412001e-01,+0.000000000000000e+00,+6.600000000000000e-02} 0 : (+4.094741957310338e-01 +0.000000000000000e+00*i) +1 : (-2.200741957310339e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.600000000000000e-02 Eigenvalues of linearized matrix around x = {+8.945877001223000e-01,+0.000000000000000e+00,+6.550000000000000e-02} 0 : (+4.105136885370229e-01 +0.000000000000000e+00*i) +1 : (-2.211136885370230e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.550000000000000e-02 Eigenvalues of linearized matrix around x = {+8.956854408212001e-01,+0.000000000000000e+00,+6.500000000000000e-02} 0 : (+4.115446366048579e-01 +0.000000000000000e+00*i) +1 : (-2.221446366048580e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.500000000000000e-02 Eigenvalues of linearized matrix around x = {+8.967753966587001e-01,+0.000000000000000e+00,+6.450000000000000e-02} 0 : (+4.125672157289035e-01 +0.000000000000000e+00*i) +1 : (-2.231672157289036e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.450000000000000e-02 Eigenvalues of linearized matrix around x = {+8.978577143620000e-01,+0.000000000000000e+00,+6.400000000000000e-02} 0 : (+4.135815959723184e-01 +0.000000000000000e+00*i) +1 : (-2.241815959723184e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.400000000000000e-02 Eigenvalues of linearized matrix around x = {+8.989325361655001e-01,+0.000000000000000e+00,+6.350000000000000e-02} 0 : (+4.145879419214217e-01 +0.000000000000000e+00*i) +1 : (-2.251879419214217e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.350000000000000e-02 Eigenvalues of linearized matrix around x = {+9.000000000000000e-01,+0.000000000000000e+00,+6.300000000000000e-02} 0 : (+4.155864129251970e-01 +0.000000000000000e+00*i) +1 : (-2.261864129251970e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.300000000000000e-02 Eigenvalues of linearized matrix around x = {+9.010602396722001e-01,+0.000000000000000e+00,+6.250000000000000e-02} 0 : (+4.165771633220001e-01 +0.000000000000000e+00*i) +1 : (-2.271771633220002e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.250000000000000e-02 Eigenvalues of linearized matrix around x = {+9.021133850347001e-01,+0.000000000000000e+00,+6.200000000000001e-02} 0 : (+4.175603426539144e-01 +0.000000000000000e+00*i) +1 : (-2.281603426539144e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.200000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.200000000000001e-02 Eigenvalues of linearized matrix around x = {+9.031595621472001e-01,+0.000000000000000e+00,+6.150000000000001e-02} 0 : (+4.185360958696502e-01 +0.000000000000000e+00*i) +1 : (-2.291360958696503e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.150000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.150000000000001e-02 Eigenvalues of linearized matrix around x = {+9.041988934287001e-01,+0.000000000000000e+00,+6.100000000000001e-02} 0 : (+4.195045635160248e-01 +0.000000000000000e+00*i) +1 : (-2.301045635160249e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.100000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.100000000000001e-02 Eigenvalues of linearized matrix around x = {+9.052314978032000e-01,+0.000000000000000e+00,+6.050000000000001e-02} 0 : (+4.204658819205580e-01 +0.000000000000000e+00*i) +1 : (-2.310658819205580e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.050000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.050000000000001e-02 Eigenvalues of linearized matrix around x = {+9.062574908365001e-01,+0.000000000000000e+00,+6.000000000000000e-02} 0 : (+4.214201833631363e-01 +0.000000000000000e+00*i) +1 : (-2.320201833631363e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.000000000000000e-02 Eigenvalues of linearized matrix around x = {+9.072769848674000e-01,+0.000000000000000e+00,+5.950000000000000e-02} 0 : (+4.223675962399948e-01 +0.000000000000000e+00*i) +1 : (-2.329675962399949e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.950000000000000e-02 Eigenvalues of linearized matrix around x = {+9.082900891321001e-01,+0.000000000000000e+00,+5.900000000000000e-02} 0 : (+4.233082452190616e-01 +0.000000000000000e+00*i) +1 : (-2.339082452190617e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.900000000000000e-02 Eigenvalues of linearized matrix around x = {+9.092969098819000e-01,+0.000000000000000e+00,+5.850000000000000e-02} 0 : (+4.242422513869069e-01 +0.000000000000000e+00*i) +1 : (-2.348422513869070e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.850000000000000e-02 Eigenvalues of linearized matrix around x = {+9.102975504959001e-01,+0.000000000000000e+00,+5.800000000000000e-02} 0 : (+4.251697323890185e-01 +0.000000000000000e+00*i) +1 : (-2.357697323890185e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.800000000000000e-02 Eigenvalues of linearized matrix around x = {+9.112921115883000e-01,+0.000000000000000e+00,+5.750000000000000e-02} 0 : (+4.260908025631575e-01 +0.000000000000000e+00*i) +1 : (-2.366908025631576e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.750000000000000e-02 Eigenvalues of linearized matrix around x = {+9.122806911101000e-01,+0.000000000000000e+00,+5.700000000000000e-02} 0 : (+4.270055730657328e-01 +0.000000000000000e+00*i) +1 : (-2.376055730657328e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.700000000000000e-02 Eigenvalues of linearized matrix around x = {+9.132633844465000e-01,+0.000000000000000e+00,+5.650000000000000e-02} 0 : (+4.279141519925068e-01 +0.000000000000000e+00*i) +1 : (-2.385141519925069e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.650000000000000e-02 Eigenvalues of linearized matrix around x = {+9.142402845096000e-01,+0.000000000000000e+00,+5.600000000000000e-02} 0 : (+4.288166444933695e-01 +0.000000000000000e+00*i) +1 : (-2.394166444933696e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.600000000000000e-02 Eigenvalues of linearized matrix around x = {+9.152114818269000e-01,+0.000000000000000e+00,+5.550000000000000e-02} 0 : (+4.297131528817371e-01 +0.000000000000000e+00*i) +1 : (-2.403131528817371e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.550000000000000e-02 Eigenvalues of linearized matrix around x = {+9.161770646257000e-01,+0.000000000000000e+00,+5.500000000000000e-02} 0 : (+4.306037767387597e-01 +0.000000000000000e+00*i) +1 : (-2.412037767387597e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.500000000000000e-02 Eigenvalues of linearized matrix around x = {+9.171371189137001e-01,+0.000000000000000e+00,+5.450000000000001e-02} 0 : (+4.314886130126989e-01 +0.000000000000000e+00*i) +1 : (-2.420886130126990e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.450000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.450000000000001e-02 Eigenvalues of linearized matrix around x = {+9.180917285563001e-01,+0.000000000000000e+00,+5.400000000000001e-02} 0 : (+4.323677561140136e-01 +0.000000000000000e+00*i) +1 : (-2.429677561140137e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.400000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.400000000000001e-02 Eigenvalues of linearized matrix around x = {+9.190409753500001e-01,+0.000000000000000e+00,+5.350000000000001e-02} 0 : (+4.332412980056756e-01 +0.000000000000000e+00*i) +1 : (-2.438412980056756e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.350000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.350000000000001e-02 Eigenvalues of linearized matrix around x = {+9.199849390929000e-01,+0.000000000000000e+00,+5.300000000000001e-02} 0 : (+4.341093282897042e-01 +0.000000000000000e+00*i) +1 : (-2.447093282897042e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.300000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.300000000000001e-02 Eigenvalues of linearized matrix around x = {+9.209236976521000e-01,+0.000000000000000e+00,+5.250000000000000e-02} 0 : (+4.349719342898000e-01 +0.000000000000000e+00*i) +1 : (-2.455719342898000e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.250000000000000e-02 Eigenvalues of linearized matrix around x = {+9.218573270284001e-01,+0.000000000000000e+00,+5.200000000000000e-02} 0 : (+4.358292011305041e-01 +0.000000000000000e+00*i) +1 : (-2.464292011305041e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.200000000000000e-02 Eigenvalues of linearized matrix around x = {+9.227859014177000e-01,+0.000000000000000e+00,+5.150000000000000e-02} 0 : (+4.366812118123894e-01 +0.000000000000000e+00*i) +1 : (-2.472812118123894e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.150000000000000e-02 Eigenvalues of linearized matrix around x = {+9.237094932703001e-01,+0.000000000000000e+00,+5.100000000000000e-02} 0 : (+4.375280472844378e-01 +0.000000000000000e+00*i) +1 : (-2.481280472844378e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.100000000000000e-02 Eigenvalues of linearized matrix around x = {+9.246281733480001e-01,+0.000000000000000e+00,+5.050000000000000e-02} 0 : (+4.383697865135595e-01 +0.000000000000000e+00*i) +1 : (-2.489697865135595e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.050000000000000e-02 Eigenvalues of linearized matrix around x = {+9.255420107777000e-01,+0.000000000000000e+00,+5.000000000000000e-02} 0 : (+4.392065065501099e-01 +0.000000000000000e+00*i) +1 : (-2.498065065501100e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.000000000000000e-02 Eigenvalues of linearized matrix around x = {+9.264510731042001e-01,+0.000000000000000e+00,+4.950000000000000e-02} 0 : (+4.400382825919222e-01 +0.000000000000000e+00*i) +1 : (-2.506382825919222e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.950000000000000e-02 Eigenvalues of linearized matrix around x = {+9.273554263399001e-01,+0.000000000000000e+00,+4.900000000000000e-02} 0 : (+4.408651880447869e-01 +0.000000000000000e+00*i) +1 : (-2.514651880447870e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.900000000000000e-02 Eigenvalues of linearized matrix around x = {+9.282551350129000e-01,+0.000000000000000e+00,+4.850000000000000e-02} 0 : (+4.416872945807935e-01 +0.000000000000000e+00*i) +1 : (-2.522872945807936e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.850000000000000e-02 Eigenvalues of linearized matrix around x = {+9.291502622129001e-01,+0.000000000000000e+00,+4.800000000000000e-02} 0 : (+4.425046721940184e-01 +0.000000000000000e+00*i) +1 : (-2.531046721940184e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.800000000000000e-02 Eigenvalues of linearized matrix around x = {+9.300408696359000e-01,+0.000000000000000e+00,+4.750000000000000e-02} 0 : (+4.433173892545074e-01 +0.000000000000000e+00*i) +1 : (-2.539173892545075e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.750000000000000e-02 Eigenvalues of linearized matrix around x = {+9.309270176262000e-01,+0.000000000000000e+00,+4.700000000000000e-02} 0 : (+4.441255125592160e-01 +0.000000000000000e+00*i) +1 : (-2.547255125592160e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.700000000000000e-02 Eigenvalues of linearized matrix around x = {+9.318087652179000e-01,+0.000000000000000e+00,+4.650000000000001e-02} 0 : (+4.449291073819429e-01 +0.000000000000000e+00*i) +1 : (-2.555291073819430e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.650000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.650000000000001e-02 Eigenvalues of linearized matrix around x = {+9.326861701736000e-01,+0.000000000000000e+00,+4.600000000000001e-02} 0 : (+4.457282375201894e-01 +0.000000000000000e+00*i) +1 : (-2.563282375201895e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.600000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.600000000000001e-02 Eigenvalues of linearized matrix around x = {+9.335592890226001e-01,+0.000000000000000e+00,+4.550000000000001e-02} 0 : (+4.465229653410668e-01 +0.000000000000000e+00*i) +1 : (-2.571229653410669e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.550000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.550000000000001e-02 Eigenvalues of linearized matrix around x = {+9.344281770973001e-01,+0.000000000000000e+00,+4.500000000000001e-02} 0 : (+4.473133518250917e-01 +0.000000000000000e+00*i) +1 : (-2.579133518250918e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.500000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.500000000000001e-02 Eigenvalues of linearized matrix around x = {+9.352928885679000e-01,+0.000000000000000e+00,+4.450000000000000e-02} 0 : (+4.480994566079860e-01 +0.000000000000000e+00*i) +1 : (-2.586994566079860e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.450000000000000e-02 Eigenvalues of linearized matrix around x = {+9.361534764764000e-01,+0.000000000000000e+00,+4.400000000000000e-02} 0 : (+4.488813380214121e-01 +0.000000000000000e+00*i) +1 : (-2.594813380214122e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.400000000000000e-02 Eigenvalues of linearized matrix around x = {+9.370099927691000e-01,+0.000000000000000e+00,+4.350000000000000e-02} 0 : (+4.496590531319370e-01 +0.000000000000000e+00*i) +1 : (-2.602590531319371e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.350000000000000e-02 Eigenvalues of linearized matrix around x = {+9.378624883276001e-01,+0.000000000000000e+00,+4.300000000000000e-02} 0 : (+4.504326577782460e-01 +0.000000000000000e+00*i) +1 : (-2.610326577782460e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.300000000000000e-02 Eigenvalues of linearized matrix around x = {+9.387110129992000e-01,+0.000000000000000e+00,+4.250000000000000e-02} 0 : (+4.512022066074410e-01 +0.000000000000000e+00*i) +1 : (-2.618022066074411e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.250000000000000e-02 Eigenvalues of linearized matrix around x = {+9.395556156258000e-01,+0.000000000000000e+00,+4.200000000000000e-02} 0 : (+4.519677531096274e-01 +0.000000000000000e+00*i) +1 : (-2.625677531096274e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.200000000000000e-02 Eigenvalues of linearized matrix around x = {+9.403963440722001e-01,+0.000000000000000e+00,+4.150000000000000e-02} 0 : (+4.527293496516170e-01 +0.000000000000000e+00*i) +1 : (-2.633293496516171e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.150000000000000e-02 Eigenvalues of linearized matrix around x = {+9.412332452527000e-01,+0.000000000000000e+00,+4.100000000000000e-02} 0 : (+4.534870475087717e-01 +0.000000000000000e+00*i) +1 : (-2.640870475087718e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.100000000000000e-02 Eigenvalues of linearized matrix around x = {+9.420663651575001e-01,+0.000000000000000e+00,+4.050000000000000e-02} 0 : (+4.542408968963594e-01 +0.000000000000000e+00*i) +1 : (-2.648408968963595e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.050000000000000e-02 Eigenvalues of linearized matrix around x = {+9.428957488776001e-01,+0.000000000000000e+00,+4.000000000000000e-02} 0 : (+4.549909469992580e-01 +0.000000000000000e+00*i) +1 : (-2.655909469992581e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.000000000000000e-02 Eigenvalues of linearized matrix around x = {+9.437214406294001e-01,+0.000000000000000e+00,+3.950000000000000e-02} 0 : (+4.557372460011102e-01 +0.000000000000000e+00*i) +1 : (-2.663372460011103e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.950000000000000e-02 Eigenvalues of linearized matrix around x = {+9.445434837779001e-01,+0.000000000000000e+00,+3.900000000000001e-02} 0 : (+4.564798411119438e-01 +0.000000000000000e+00*i) +1 : (-2.670798411119439e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.900000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.900000000000001e-02 Eigenvalues of linearized matrix around x = {+9.453619208597001e-01,+0.000000000000000e+00,+3.850000000000001e-02} 0 : (+4.572187785953564e-01 +0.000000000000000e+00*i) +1 : (-2.678187785953565e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.850000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.850000000000001e-02 Eigenvalues of linearized matrix around x = {+9.461767936042000e-01,+0.000000000000000e+00,+3.800000000000001e-02} 0 : (+4.579541037938304e-01 +0.000000000000000e+00*i) +1 : (-2.685541037938306e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.800000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.800000000000001e-02 Eigenvalues of linearized matrix around x = {+9.469881429557001e-01,+0.000000000000000e+00,+3.750000000000001e-02} 0 : (+4.586858611546268e-01 +0.000000000000000e+00*i) +1 : (-2.692858611546269e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.750000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.750000000000001e-02 Eigenvalues of linearized matrix around x = {+9.477960090929001e-01,+0.000000000000000e+00,+3.700000000000001e-02} 0 : (+4.594140942531083e-01 +0.000000000000000e+00*i) +1 : (-2.700140942531084e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.700000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.700000000000001e-02 Eigenvalues of linearized matrix around x = {+9.486004314493001e-01,+0.000000000000000e+00,+3.650000000000000e-02} 0 : (+4.601388458166631e-01 +0.000000000000000e+00*i) +1 : (-2.707388458166632e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.650000000000000e-02 Eigenvalues of linearized matrix around x = {+9.494014487322000e-01,+0.000000000000000e+00,+3.600000000000000e-02} 0 : (+4.608601577471587e-01 +0.000000000000000e+00*i) +1 : (-2.714601577471588e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.600000000000000e-02 Eigenvalues of linearized matrix around x = {+9.501990989410001e-01,+0.000000000000000e+00,+3.550000000000000e-02} 0 : (+4.615780711425705e-01 +0.000000000000000e+00*i) +1 : (-2.721780711425706e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.550000000000000e-02 Eigenvalues of linearized matrix around x = {+9.509934193852001e-01,+0.000000000000000e+00,+3.500000000000000e-02} 0 : (+4.622926263181526e-01 +0.000000000000000e+00*i) +1 : (-2.728926263181527e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.500000000000000e-02 Eigenvalues of linearized matrix around x = {+9.517844467017000e-01,+0.000000000000000e+00,+3.450000000000000e-02} 0 : (+4.630038628267979e-01 +0.000000000000000e+00*i) +1 : (-2.736038628267980e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.450000000000000e-02 Eigenvalues of linearized matrix around x = {+9.525722168718000e-01,+0.000000000000000e+00,+3.400000000000000e-02} 0 : (+4.637118194789557e-01 +0.000000000000000e+00*i) +1 : (-2.743118194789558e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.400000000000000e-02 Eigenvalues of linearized matrix around x = {+9.533567652369001e-01,+0.000000000000000e+00,+3.350000000000000e-02} 0 : (+4.644165343612150e-01 +0.000000000000000e+00*i) +1 : (-2.750165343612150e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.350000000000000e-02 Eigenvalues of linearized matrix around x = {+9.541381265149000e-01,+0.000000000000000e+00,+3.300000000000000e-02} 0 : (+4.651180448553581e-01 +0.000000000000000e+00*i) +1 : (-2.757180448553581e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.300000000000000e-02 Eigenvalues of linearized matrix around x = {+9.549163348148001e-01,+0.000000000000000e+00,+3.250000000000000e-02} 0 : (+4.658163876556448e-01 +0.000000000000000e+00*i) +1 : (-2.764163876556448e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.250000000000000e-02 Eigenvalues of linearized matrix around x = {+9.556914236517000e-01,+0.000000000000000e+00,+3.200000000000000e-02} 0 : (+4.665115987863099e-01 +0.000000000000000e+00*i) +1 : (-2.771115987863100e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.200000000000000e-02 Eigenvalues of linearized matrix around x = {+9.564634259613001e-01,+0.000000000000000e+00,+3.150000000000000e-02} 0 : (+4.672037136184717e-01 +0.000000000000000e+00*i) +1 : (-2.778037136184717e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.150000000000000e-02 Eigenvalues of linearized matrix around x = {+9.572323741135000e-01,+0.000000000000000e+00,+3.100000000000000e-02} 0 : (+4.678927668860968e-01 +0.000000000000000e+00*i) +1 : (-2.784927668860969e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.100000000000000e-02 Eigenvalues of linearized matrix around x = {+9.579982999259000e-01,+0.000000000000000e+00,+3.050000000000000e-02} 0 : (+4.685787927017482e-01 +0.000000000000000e+00*i) +1 : (-2.791787927017483e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.050000000000000e-02 Eigenvalues of linearized matrix around x = {+9.587612346770000e-01,+0.000000000000000e+00,+3.000000000000000e-02} 0 : (+4.692618245719381e-01 +0.000000000000000e+00*i) +1 : (-2.798618245719381e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.000000000000000e-02 Eigenvalues of linearized matrix around x = {+9.595212091183001e-01,+0.000000000000000e+00,+2.950000000000000e-02} 0 : (+4.699418954113769e-01 +0.000000000000000e+00*i) +1 : (-2.805418954113770e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.950000000000000e-02 Eigenvalues of linearized matrix around x = {+9.602782534874000e-01,+0.000000000000000e+00,+2.900000000000000e-02} 0 : (+4.706190375580024e-01 +0.000000000000000e+00*i) +1 : (-2.812190375580024e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.900000000000000e-02 Eigenvalues of linearized matrix around x = {+9.610323975191001e-01,+0.000000000000000e+00,+2.850000000000000e-02} 0 : (+4.712932827861083e-01 +0.000000000000000e+00*i) +1 : (-2.818932827861084e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.850000000000000e-02 Eigenvalues of linearized matrix around x = {+9.617836704576000e-01,+0.000000000000000e+00,+2.800000000000000e-02} 0 : (+4.719646623203504e-01 +0.000000000000000e+00*i) +1 : (-2.825646623203505e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.800000000000000e-02 Eigenvalues of linearized matrix around x = {+9.625321010672001e-01,+0.000000000000000e+00,+2.750000000000000e-02} 0 : (+4.726332068483096e-01 +0.000000000000000e+00*i) +1 : (-2.832332068483097e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.750000000000000e-02 Eigenvalues of linearized matrix around x = {+9.632777176433001e-01,+0.000000000000000e+00,+2.700000000000000e-02} 0 : (+4.732989465332242e-01 +0.000000000000000e+00*i) +1 : (-2.838989465332243e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.700000000000000e-02 Eigenvalues of linearized matrix around x = {+9.640205480234001e-01,+0.000000000000000e+00,+2.650000000000000e-02} 0 : (+4.739619110266280e-01 +0.000000000000000e+00*i) +1 : (-2.845619110266281e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.650000000000000e-02 Eigenvalues of linearized matrix around x = {+9.647606195967000e-01,+0.000000000000000e+00,+2.600000000000000e-02} 0 : (+4.746221294796463e-01 +0.000000000000000e+00*i) +1 : (-2.852221294796464e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.600000000000000e-02 Eigenvalues of linearized matrix around x = {+9.654979593145001e-01,+0.000000000000000e+00,+2.550000000000000e-02} 0 : (+4.752796305549187e-01 +0.000000000000000e+00*i) +1 : (-2.858796305549188e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.550000000000000e-02 Eigenvalues of linearized matrix around x = {+9.662325936998001e-01,+0.000000000000000e+00,+2.500000000000000e-02} 0 : (+4.759344424377233e-01 +0.000000000000000e+00*i) +1 : (-2.865344424377234e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.500000000000000e-02 Eigenvalues of linearized matrix around x = {+9.669645488566001e-01,+0.000000000000000e+00,+2.450000000000000e-02} 0 : (+4.765865928467519e-01 +0.000000000000000e+00*i) +1 : (-2.871865928467520e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.450000000000000e-02 Eigenvalues of linearized matrix around x = {+9.676938504794000e-01,+0.000000000000000e+00,+2.400000000000000e-02} 0 : (+4.772361090449848e-01 +0.000000000000000e+00*i) +1 : (-2.878361090449848e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.400000000000000e-02 Eigenvalues of linearized matrix around x = {+9.684205238616000e-01,+0.000000000000000e+00,+2.350000000000000e-02} 0 : (+4.778830178495095e-01 +0.000000000000000e+00*i) +1 : (-2.884830178495096e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.350000000000000e-02 Eigenvalues of linearized matrix around x = {+9.691445939044001e-01,+0.000000000000000e+00,+2.300000000000000e-02} 0 : (+4.785273456417126e-01 +0.000000000000000e+00*i) +1 : (-2.891273456417127e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.300000000000000e-02 Eigenvalues of linearized matrix around x = {+9.698660851254001e-01,+0.000000000000000e+00,+2.250000000000000e-02} 0 : (+4.791691183771329e-01 +0.000000000000000e+00*i) +1 : (-2.897691183771329e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.250000000000000e-02 Eigenvalues of linearized matrix around x = {+9.705850216664000e-01,+0.000000000000000e+00,+2.200000000000000e-02} 0 : (+4.798083615945358e-01 +0.000000000000000e+00*i) +1 : (-2.904083615945359e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.200000000000000e-02 Eigenvalues of linearized matrix around x = {+9.713014273017001e-01,+0.000000000000000e+00,+2.150000000000000e-02} 0 : (+4.804451004253662e-01 +0.000000000000000e+00*i) +1 : (-2.910451004253662e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.150000000000000e-02 Eigenvalues of linearized matrix around x = {+9.720153254455001e-01,+0.000000000000000e+00,+2.100000000000000e-02} 0 : (+4.810793596023380e-01 +0.000000000000000e+00*i) +1 : (-2.916793596023381e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.100000000000000e-02 Eigenvalues of linearized matrix around x = {+9.727267391599000e-01,+0.000000000000000e+00,+2.050000000000000e-02} 0 : (+4.817111634684965e-01 +0.000000000000000e+00*i) +1 : (-2.923111634684966e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.050000000000000e-02 Eigenvalues of linearized matrix around x = {+9.734356911617000e-01,+0.000000000000000e+00,+2.000000000000000e-02} 0 : (+4.823405359851546e-01 +0.000000000000000e+00*i) +1 : (-2.929405359851547e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.000000000000000e-02 Eigenvalues of linearized matrix around x = {+9.741422038301001e-01,+0.000000000000000e+00,+1.950000000000000e-02} 0 : (+4.829675007405726e-01 +0.000000000000000e+00*i) +1 : (-2.935675007405726e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.950000000000000e-02 Eigenvalues of linearized matrix around x = {+9.748462992131001e-01,+0.000000000000000e+00,+1.900000000000000e-02} 0 : (+4.835920809574273e-01 +0.000000000000000e+00*i) +1 : (-2.941920809574274e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.900000000000000e-02 Eigenvalues of linearized matrix around x = {+9.755479990347000e-01,+0.000000000000000e+00,+1.850000000000000e-02} 0 : (+4.842142995009403e-01 +0.000000000000000e+00*i) +1 : (-2.948142995009404e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.850000000000000e-02 Eigenvalues of linearized matrix around x = {+9.762473247013000e-01,+0.000000000000000e+00,+1.800000000000000e-02} 0 : (+4.848341788862434e-01 +0.000000000000000e+00*i) +1 : (-2.954341788862435e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.800000000000000e-02 Eigenvalues of linearized matrix around x = {+9.769442973082001e-01,+0.000000000000000e+00,+1.750000000000000e-02} 0 : (+4.854517412857833e-01 +0.000000000000000e+00*i) +1 : (-2.960517412857833e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.750000000000000e-02 Eigenvalues of linearized matrix around x = {+9.776389376456001e-01,+0.000000000000000e+00,+1.700000000000000e-02} 0 : (+4.860670085362363e-01 +0.000000000000000e+00*i) +1 : (-2.966670085362364e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.700000000000000e-02 Eigenvalues of linearized matrix around x = {+9.783312662051000e-01,+0.000000000000000e+00,+1.650000000000000e-02} 0 : (+4.866800021458194e-01 +0.000000000000000e+00*i) +1 : (-2.972800021458195e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.650000000000000e-02 Eigenvalues of linearized matrix around x = {+9.790213031855001e-01,+0.000000000000000e+00,+1.600000000000000e-02} 0 : (+4.872907433009353e-01 +0.000000000000000e+00*i) +1 : (-2.978907433009354e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.600000000000000e-02 Eigenvalues of linearized matrix around x = {+9.797090684984000e-01,+0.000000000000000e+00,+1.550000000000000e-02} 0 : (+4.878992528725984e-01 +0.000000000000000e+00*i) +1 : (-2.984992528725985e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.550000000000000e-02 Eigenvalues of linearized matrix around x = {+9.803945817741001e-01,+0.000000000000000e+00,+1.500000000000000e-02} 0 : (+4.885055514230844e-01 +0.000000000000000e+00*i) +1 : (-2.991055514230844e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.500000000000000e-02 Eigenvalues of linearized matrix around x = {+9.810778623668001e-01,+0.000000000000000e+00,+1.450000000000000e-02} 0 : (+4.891096592119188e-01 +0.000000000000000e+00*i) +1 : (-2.997096592119188e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.450000000000000e-02 Eigenvalues of linearized matrix around x = {+9.817589293604001e-01,+0.000000000000000e+00,+1.400000000000000e-02} 0 : (+4.897115962023589e-01 +0.000000000000000e+00*i) +1 : (-3.003115962023590e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.400000000000000e-02 Eigenvalues of linearized matrix around x = {+9.824378015734001e-01,+0.000000000000000e+00,+1.350000000000000e-02} 0 : (+4.903113820670397e-01 +0.000000000000000e+00*i) +1 : (-3.009113820670398e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.350000000000000e-02 Eigenvalues of linearized matrix around x = {+9.831144975640000e-01,+0.000000000000000e+00,+1.300000000000000e-02} 0 : (+4.909090361937619e-01 +0.000000000000000e+00*i) +1 : (-3.015090361937620e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.300000000000000e-02 Eigenvalues of linearized matrix around x = {+9.837890356352000e-01,+0.000000000000000e+00,+1.250000000000000e-02} 0 : (+4.915045776912436e-01 +0.000000000000000e+00*i) +1 : (-3.021045776912437e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.250000000000000e-02 Eigenvalues of linearized matrix around x = {+9.844614338398000e-01,+0.000000000000000e+00,+1.200000000000000e-02} 0 : (+4.920980253947482e-01 +0.000000000000000e+00*i) +1 : (-3.026980253947483e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.200000000000000e-02 Eigenvalues of linearized matrix around x = {+9.851317099847000e-01,+0.000000000000000e+00,+1.150000000000000e-02} 0 : (+4.926893978710633e-01 +0.000000000000000e+00*i) +1 : (-3.032893978710633e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.150000000000000e-02 Eigenvalues of linearized matrix around x = {+9.857998816360001e-01,+0.000000000000000e+00,+1.100000000000000e-02} 0 : (+4.932787134241504e-01 +0.000000000000000e+00*i) +1 : (-3.038787134241505e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.100000000000000e-02 Eigenvalues of linearized matrix around x = {+9.864659661233001e-01,+0.000000000000000e+00,+1.050000000000000e-02} 0 : (+4.938659901000603e-01 +0.000000000000000e+00*i) +1 : (-3.044659901000604e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.050000000000000e-02 Eigenvalues of linearized matrix around x = {+9.871299805439001e-01,+0.000000000000000e+00,+1.000000000000000e-02} 0 : (+4.944512456917281e-01 +0.000000000000000e+00*i) +1 : (-3.050512456917281e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.000000000000000e-02 Eigenvalues of linearized matrix around x = {+9.877919417676001e-01,+0.000000000000000e+00,+9.500000000001001e-03} 0 : (+4.950344977442682e-01 +0.000000000000000e+00*i) +1 : (-3.056344977442683e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.500000000001001e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.500000000001001e-03 Eigenvalues of linearized matrix around x = {+9.884518664404001e-01,+0.000000000000000e+00,+9.000000000001000e-03} 0 : (+4.956157635592722e-01 +0.000000000000000e+00*i) +1 : (-3.062157635592723e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.000000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.000000000001000e-03 Eigenvalues of linearized matrix around x = {+9.891097709890001e-01,+0.000000000000000e+00,+8.500000000001002e-03} 0 : (+4.961950601997829e-01 +0.000000000000000e+00*i) +1 : (-3.067950601997830e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.500000000001002e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.500000000001002e-03 Eigenvalues of linearized matrix around x = {+9.897656716244001e-01,+0.000000000000000e+00,+8.000000000001001e-03} 0 : (+4.967724044944490e-01 +0.000000000000000e+00*i) +1 : (-3.073724044944491e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.000000000001001e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.000000000001001e-03 Eigenvalues of linearized matrix around x = {+9.904195843462000e-01,+0.000000000000000e+00,+7.500000000001001e-03} 0 : (+4.973478130422712e-01 +0.000000000000000e+00*i) +1 : (-3.079478130422713e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.500000000001001e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.500000000001001e-03 Eigenvalues of linearized matrix around x = {+9.910715249462001e-01,+0.000000000000000e+00,+7.000000000001000e-03} 0 : (+4.979213022167056e-01 +0.000000000000000e+00*i) +1 : (-3.085213022167057e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.000000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.000000000001000e-03 Eigenvalues of linearized matrix around x = {+9.917215090122000e-01,+0.000000000000000e+00,+6.500000000001001e-03} 0 : (+4.984928881699194e-01 +0.000000000000000e+00*i) +1 : (-3.090928881699195e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.500000000001001e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.500000000001001e-03 Eigenvalues of linearized matrix around x = {+9.923695519316000e-01,+0.000000000000000e+00,+6.000000000001000e-03} 0 : (+4.990625868368472e-01 +0.000000000000000e+00*i) +1 : (-3.096625868368472e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.000000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.000000000001000e-03 Eigenvalues of linearized matrix around x = {+9.930156688951001e-01,+0.000000000000000e+00,+5.500000000001001e-03} 0 : (+4.996304139393110e-01 +0.000000000000000e+00*i) +1 : (-3.102304139393111e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.500000000001001e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.500000000001001e-03 Eigenvalues of linearized matrix around x = {+9.936598748998000e-01,+0.000000000000000e+00,+5.000000000001000e-03} 0 : (+5.001963849895924e-01 +0.000000000000000e+00*i) +1 : (-3.107963849895925e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.000000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.000000000001000e-03 Eigenvalues of linearized matrix around x = {+9.943021847533000e-01,+0.000000000000000e+00,+4.500000000001001e-03} 0 : (+5.007605152948602e-01 +0.000000000000000e+00*i) +1 : (-3.113605152948602e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.500000000001001e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.500000000001001e-03 Eigenvalues of linearized matrix around x = {+9.949426130764001e-01,+0.000000000000000e+00,+4.000000000001000e-03} 0 : (+5.013228199603473e-01 +0.000000000000000e+00*i) +1 : (-3.119228199603474e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.000000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.000000000001000e-03 Eigenvalues of linearized matrix around x = {+9.955811743065001e-01,+0.000000000000000e+00,+3.500000000001000e-03} 0 : (+5.018833138931234e-01 +0.000000000000000e+00*i) +1 : (-3.124833138931233e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.500000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.500000000001000e-03 Eigenvalues of linearized matrix around x = {+9.962178827009001e-01,+0.000000000000000e+00,+3.000000000001000e-03} 0 : (+5.024420118057576e-01 +0.000000000000000e+00*i) +1 : (-3.130420118057576e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.000000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.000000000001000e-03 Eigenvalues of linearized matrix around x = {+9.968527523399000e-01,+0.000000000000000e+00,+2.500000000001000e-03} 0 : (+5.029989282197891e-01 +0.000000000000000e+00*i) +1 : (-3.135989282197891e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.500000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.500000000001000e-03 Eigenvalues of linearized matrix around x = {+9.974857971299000e-01,+0.000000000000000e+00,+2.000000000001000e-03} 0 : (+5.035540774691764e-01 +0.000000000000000e+00*i) +1 : (-3.141540774691765e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.000000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.000000000001000e-03 Eigenvalues of linearized matrix around x = {+9.981170308060000e-01,+0.000000000000000e+00,+1.500000000001000e-03} 0 : (+5.041074737032916e-01 +0.000000000000000e+00*i) +1 : (-3.147074737032916e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.500000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.500000000001000e-03 Eigenvalues of linearized matrix around x = {+9.987464669356001e-01,+0.000000000000000e+00,+1.000000000001000e-03} 0 : (+5.046591308907733e-01 +0.000000000000000e+00*i) +1 : (-3.152591308907734e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.000000000001000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.000000000001000e-03 Eigenvalues of linearized matrix around x = {+9.993741189204001e-01,+0.000000000000000e+00,+5.000000000015000e-04} 0 : (+5.052090628219595e-01 +0.000000000000000e+00*i) +1 : (-3.158090628219596e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.000000000015000e-04 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.000000000015000e-04 Eigenvalues of linearized matrix around x = {+1.000000000000000e+00,+0.000000000000000e+00,+1.464106613724000e-15} 0 : (+5.057572831127068e-01 +0.000000000000000e+00*i) +1 : (-3.163572831127068e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.464106613724000e-15 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.464106613724000e-15 Eigenvalues of linearized matrix around x = {+1.000624123254000e+00,+0.000000000000000e+00,-4.999999999984999e-04} 0 : (+5.063038052068782e-01 +0.000000000000000e+00*i) +1 : (-3.169038052068783e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.999999999984999e-04 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.999999999984999e-04 Eigenvalues of linearized matrix around x = {+1.001246501605000e+00,+0.000000000000000e+00,-9.999999999984999e-04} 0 : (+5.068486423796041e-01 +0.000000000000000e+00*i) +1 : (-3.174486423796041e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.999999999984999e-04 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.999999999984999e-04 Eigenvalues of linearized matrix around x = {+1.001867147821000e+00,+0.000000000000000e+00,-1.499999999999000e-03} 0 : (+5.073918077400028e-01 +0.000000000000000e+00*i) +1 : (-3.179918077400028e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.499999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.499999999999000e-03 Eigenvalues of linearized matrix around x = {+1.002486074519000e+00,+0.000000000000000e+00,-1.999999999999000e-03} 0 : (+5.079333142349349e-01 +0.000000000000000e+00*i) +1 : (-3.185333142349350e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.999999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.999999999999000e-03 Eigenvalues of linearized matrix around x = {+1.003103294164000e+00,+0.000000000000000e+00,-2.499999999999000e-03} 0 : (+5.084731746487212e-01 +0.000000000000000e+00*i) +1 : (-3.190731746487212e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.499999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.499999999999000e-03 Eigenvalues of linearized matrix around x = {+1.003718819078000e+00,+0.000000000000000e+00,-2.999999999999000e-03} 0 : (+5.090114016115911e-01 +0.000000000000000e+00*i) +1 : (-3.196114016115911e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.999999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.999999999999000e-03 Eigenvalues of linearized matrix around x = {+1.004332661435000e+00,+0.000000000000000e+00,-3.499999999999000e-03} 0 : (+5.095480075958739e-01 +0.000000000000000e+00*i) +1 : (-3.201480075958740e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.499999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.499999999999000e-03 Eigenvalues of linearized matrix around x = {+1.004944833269000e+00,+0.000000000000000e+00,-3.999999999998999e-03} 0 : (+5.100830049235464e-01 +0.000000000000000e+00*i) +1 : (-3.206830049235465e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.999999999998999e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.999999999998999e-03 Eigenvalues of linearized matrix around x = {+1.005555346472000e+00,+0.000000000000000e+00,-4.499999999999000e-03} 0 : (+5.106164057650222e-01 +0.000000000000000e+00*i) +1 : (-3.212164057650221e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.499999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.499999999999000e-03 Eigenvalues of linearized matrix around x = {+1.006164212800000e+00,+0.000000000000000e+00,-4.999999999998999e-03} 0 : (+5.111482221449221e-01 +0.000000000000000e+00*i) +1 : (-3.217482221449220e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.999999999998999e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.999999999998999e-03 Eigenvalues of linearized matrix around x = {+1.006771443874000e+00,+0.000000000000000e+00,-5.499999999999000e-03} 0 : (+5.116784659434626e-01 +0.000000000000000e+00*i) +1 : (-3.222784659434625e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.499999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.499999999999000e-03 Eigenvalues of linearized matrix around x = {+1.007377051179000e+00,+0.000000000000000e+00,-5.999999999998999e-03} 0 : (+5.122071488960862e-01 +0.000000000000000e+00*i) +1 : (-3.228071488960862e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.999999999998999e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.999999999998999e-03 Eigenvalues of linearized matrix around x = {+1.007981046071000e+00,+0.000000000000000e+00,-6.499999999999000e-03} 0 : (+5.127342826000669e-01 +0.000000000000000e+00*i) +1 : (-3.233342826000669e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.499999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.499999999999000e-03 Eigenvalues of linearized matrix around x = {+1.008583439778000e+00,+0.000000000000000e+00,-6.999999999998999e-03} 0 : (+5.132598785158625e-01 +0.000000000000000e+00*i) +1 : (-3.238598785158625e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.999999999998999e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.999999999998999e-03 Eigenvalues of linearized matrix around x = {+1.009184243397000e+00,+0.000000000000000e+00,-7.499999999999000e-03} 0 : (+5.137839479649696e-01 +0.000000000000000e+00*i) +1 : (-3.243839479649697e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.499999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.499999999999000e-03 Eigenvalues of linearized matrix around x = {+1.009783467904000e+00,+0.000000000000000e+00,-7.999999999998999e-03} 0 : (+5.143065021391080e-01 +0.000000000000000e+00*i) +1 : (-3.249065021391081e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.999999999998999e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.999999999998999e-03 Eigenvalues of linearized matrix around x = {+1.010381124150000e+00,+0.000000000000000e+00,-8.499999999999000e-03} 0 : (+5.148275520971825e-01 +0.000000000000000e+00*i) +1 : (-3.254275520971823e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.499999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.499999999999000e-03 Eigenvalues of linearized matrix around x = {+1.010977222865000e+00,+0.000000000000000e+00,-8.999999999998998e-03} 0 : (+5.153471087692114e-01 +0.000000000000000e+00*i) +1 : (-3.259471087692114e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.999999999998998e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.999999999998998e-03 Eigenvalues of linearized matrix around x = {+1.011571774658000e+00,+0.000000000000000e+00,-9.499999999998999e-03} 0 : (+5.158651829567604e-01 +0.000000000000000e+00*i) +1 : (-3.264651829567605e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.499999999998999e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.499999999998999e-03 Eigenvalues of linearized matrix around x = {+1.012164790024000e+00,+0.000000000000000e+00,-9.999999999998999e-03} 0 : (+5.163817853394629e-01 +0.000000000000000e+00*i) +1 : (-3.269817853394630e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.999999999998999e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.999999999998999e-03 Eigenvalues of linearized matrix around x = {+1.012756279340000e+00,+0.000000000000000e+00,-1.050000000000000e-02} 0 : (+5.168969264719487e-01 +0.000000000000000e+00*i) +1 : (-3.274969264719487e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.050000000000000e-02 Eigenvalues of linearized matrix around x = {+1.013346252868000e+00,+0.000000000000000e+00,-1.100000000000000e-02} 0 : (+5.174106167868631e-01 +0.000000000000000e+00*i) +1 : (-3.280106167868629e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.100000000000000e-02 Eigenvalues of linearized matrix around x = {+1.013934720761000e+00,+0.000000000000000e+00,-1.150000000000000e-02} 0 : (+5.179228666004855e-01 +0.000000000000000e+00*i) +1 : (-3.285228666004856e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.150000000000000e-02 Eigenvalues of linearized matrix around x = {+1.014521693059000e+00,+0.000000000000000e+00,-1.200000000000000e-02} 0 : (+5.184336861096366e-01 +0.000000000000000e+00*i) +1 : (-3.290336861096367e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.200000000000000e-02 Eigenvalues of linearized matrix around x = {+1.015107179693000e+00,+0.000000000000000e+00,-1.250000000000000e-02} 0 : (+5.189430853955382e-01 +0.000000000000000e+00*i) +1 : (-3.295430853955383e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.250000000000000e-02 Eigenvalues of linearized matrix around x = {+1.015691190489000e+00,+0.000000000000000e+00,-1.300000000000000e-02} 0 : (+5.194510744276667e-01 +0.000000000000000e+00*i) +1 : (-3.300510744276668e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.300000000000000e-02 Eigenvalues of linearized matrix around x = {+1.016273735166000e+00,+0.000000000000000e+00,-1.350000000000000e-02} 0 : (+5.199576630623743e-01 +0.000000000000000e+00*i) +1 : (-3.305576630623744e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.350000000000000e-02 Eigenvalues of linearized matrix around x = {+1.016854823338000e+00,+0.000000000000000e+00,-1.400000000000000e-02} 0 : (+5.204628610449874e-01 +0.000000000000000e+00*i) +1 : (-3.310628610449874e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.400000000000000e-02 Eigenvalues of linearized matrix around x = {+1.017434464519000e+00,+0.000000000000000e+00,-1.450000000000000e-02} 0 : (+5.209666780145015e-01 +0.000000000000000e+00*i) +1 : (-3.315666780145015e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.450000000000000e-02 Eigenvalues of linearized matrix around x = {+1.018012668119000e+00,+0.000000000000000e+00,-1.500000000000000e-02} 0 : (+5.214691235004463e-01 +0.000000000000000e+00*i) +1 : (-3.320691235004464e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.500000000000000e-02 Eigenvalues of linearized matrix around x = {+1.018589443450000e+00,+0.000000000000000e+00,-1.550000000000000e-02} 0 : (+5.219702069284360e-01 +0.000000000000000e+00*i) +1 : (-3.325702069284360e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.550000000000000e-02 Eigenvalues of linearized matrix around x = {+1.019164799727000e+00,+0.000000000000000e+00,-1.600000000000000e-02} 0 : (+5.224699376213641e-01 +0.000000000000000e+00*i) +1 : (-3.330699376213642e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.600000000000000e-02 Eigenvalues of linearized matrix around x = {+1.019738746067000e+00,+0.000000000000000e+00,-1.650000000000000e-02} 0 : (+5.229683247988564e-01 +0.000000000000000e+00*i) +1 : (-3.335683247988563e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.650000000000000e-02 Eigenvalues of linearized matrix around x = {+1.020311291493000e+00,+0.000000000000000e+00,-1.700000000000000e-02} 0 : (+5.234653775810593e-01 +0.000000000000000e+00*i) +1 : (-3.340653775810593e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.700000000000000e-02 Eigenvalues of linearized matrix around x = {+1.020882444931000e+00,+0.000000000000000e+00,-1.750000000000000e-02} 0 : (+5.239611049863450e-01 +0.000000000000000e+00*i) +1 : (-3.345611049863449e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.750000000000000e-02 Eigenvalues of linearized matrix around x = {+1.021452215219000e+00,+0.000000000000000e+00,-1.800000000000000e-02} 0 : (+5.244555159394252e-01 +0.000000000000000e+00*i) +1 : (-3.350555159394253e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.800000000000000e-02 Eigenvalues of linearized matrix around x = {+1.022020611101000e+00,+0.000000000000000e+00,-1.850000000000000e-02} 0 : (+5.249486192664389e-01 +0.000000000000000e+00*i) +1 : (-3.355486192664389e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.850000000000000e-02 Eigenvalues of linearized matrix around x = {+1.022587641232000e+00,+0.000000000000000e+00,-1.900000000000000e-02} 0 : (+5.254404236995820e-01 +0.000000000000000e+00*i) +1 : (-3.360404236995820e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.900000000000000e-02 Eigenvalues of linearized matrix around x = {+1.023153314177000e+00,+0.000000000000000e+00,-1.950000000000000e-02} 0 : (+5.259309378765251e-01 +0.000000000000000e+00*i) +1 : (-3.365309378765252e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.950000000000000e-02 Eigenvalues of linearized matrix around x = {+1.023717638417000e+00,+0.000000000000000e+00,-2.000000000000000e-02} 0 : (+5.264201703458943e-01 +0.000000000000000e+00*i) +1 : (-3.370201703458942e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.000000000000000e-02 Eigenvalues of linearized matrix around x = {+1.024280622343000e+00,+0.000000000000000e+00,-2.050000000000000e-02} 0 : (+5.269081295623419e-01 +0.000000000000000e+00*i) +1 : (-3.375081295623420e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.050000000000000e-02 Eigenvalues of linearized matrix around x = {+1.024842274264000e+00,+0.000000000000000e+00,-2.100000000000000e-02} 0 : (+5.273948238937518e-01 +0.000000000000000e+00*i) +1 : (-3.379948238937518e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.100000000000000e-02 Eigenvalues of linearized matrix around x = {+1.025402602403000e+00,+0.000000000000000e+00,-2.150000000000000e-02} 0 : (+5.278802616180325e-01 +0.000000000000000e+00*i) +1 : (-3.384802616180325e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.150000000000000e-02 Eigenvalues of linearized matrix around x = {+1.025961614904000e+00,+0.000000000000000e+00,-2.200000000000000e-02} 0 : (+5.283644509294418e-01 +0.000000000000000e+00*i) +1 : (-3.389644509294418e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.200000000000000e-02 Eigenvalues of linearized matrix around x = {+1.026519319825000e+00,+0.000000000000000e+00,-2.250000000000000e-02} 0 : (+5.288473999327746e-01 +0.000000000000000e+00*i) +1 : (-3.394473999327746e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.250000000000000e-02 Eigenvalues of linearized matrix around x = {+1.027075725148000e+00,+0.000000000000000e+00,-2.300000000000000e-02} 0 : (+5.293291166522719e-01 +0.000000000000000e+00*i) +1 : (-3.399291166522718e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.300000000000000e-02 Eigenvalues of linearized matrix around x = {+1.027630838772000e+00,+0.000000000000000e+00,-2.350000000000000e-02} 0 : (+5.298096090258024e-01 +0.000000000000000e+00*i) +1 : (-3.404096090258025e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.350000000000000e-02 Eigenvalues of linearized matrix around x = {+1.028184668522000e+00,+0.000000000000000e+00,-2.400000000000000e-02} 0 : (+5.302888849128926e-01 +0.000000000000000e+00*i) +1 : (-3.408888849128926e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.400000000000000e-02 Eigenvalues of linearized matrix around x = {+1.028737222142000e+00,+0.000000000000000e+00,-2.450000000000000e-02} 0 : (+5.307669520889003e-01 +0.000000000000000e+00*i) +1 : (-3.413669520889004e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.450000000000000e-02 Eigenvalues of linearized matrix around x = {+1.029288507303000e+00,+0.000000000000000e+00,-2.500000000000000e-02} 0 : (+5.312438182521690e-01 +0.000000000000000e+00*i) +1 : (-3.418438182521690e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.500000000000000e-02 Eigenvalues of linearized matrix around x = {+1.029838531600000e+00,+0.000000000000000e+00,-2.550000000000000e-02} 0 : (+5.317194910216553e-01 +0.000000000000000e+00*i) +1 : (-3.423194910216553e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.550000000000000e-02 Eigenvalues of linearized matrix around x = {+1.030387302554000e+00,+0.000000000000000e+00,-2.600000000000000e-02} 0 : (+5.321939779388798e-01 +0.000000000000000e+00*i) +1 : (-3.427939779388798e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.600000000000000e-02 Eigenvalues of linearized matrix around x = {+1.030934827613000e+00,+0.000000000000000e+00,-2.650000000000000e-02} 0 : (+5.326672864690098e-01 +0.000000000000000e+00*i) +1 : (-3.432672864690099e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.650000000000000e-02 Eigenvalues of linearized matrix around x = {+1.031481114153000e+00,+0.000000000000000e+00,-2.700000000000000e-02} 0 : (+5.331394240019350e-01 +0.000000000000000e+00*i) +1 : (-3.437394240019351e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.700000000000000e-02 Eigenvalues of linearized matrix around x = {+1.032026169481000e+00,+0.000000000000000e+00,-2.750000000000000e-02} 0 : (+5.336103978550697e-01 +0.000000000000000e+00*i) +1 : (-3.442103978550696e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.750000000000000e-02 Eigenvalues of linearized matrix around x = {+1.032570000830000e+00,+0.000000000000000e+00,-2.800000000000000e-02} 0 : (+5.340802152692357e-01 +0.000000000000000e+00*i) +1 : (-3.446802152692355e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.800000000000000e-02 Eigenvalues of linearized matrix around x = {+1.033112615369000e+00,+0.000000000000000e+00,-2.850000000000000e-02} 0 : (+5.345488834175043e-01 +0.000000000000000e+00*i) +1 : (-3.451488834175043e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.850000000000000e-02 Eigenvalues of linearized matrix around x = {+1.033654020193000e+00,+0.000000000000000e+00,-2.900000000000000e-02} 0 : (+5.350164093967548e-01 +0.000000000000000e+00*i) +1 : (-3.456164093967548e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.900000000000000e-02 Eigenvalues of linearized matrix around x = {+1.034194222335000e+00,+0.000000000000000e+00,-2.950000000000000e-02} 0 : (+5.354828002382321e-01 +0.000000000000000e+00*i) +1 : (-3.460828002382322e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -2.950000000000000e-02 Eigenvalues of linearized matrix around x = {+1.034733228758000e+00,+0.000000000000000e+00,-3.000000000000000e-02} 0 : (+5.359480629008284e-01 +0.000000000000000e+00*i) +1 : (-3.465480629008284e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.000000000000000e-02 Eigenvalues of linearized matrix around x = {+1.035271046363000e+00,+0.000000000000000e+00,-3.050000000000000e-02} 0 : (+5.364122042781756e-01 +0.000000000000000e+00*i) +1 : (-3.470122042781756e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.050000000000000e-02 Eigenvalues of linearized matrix around x = {+1.035807681981000e+00,+0.000000000000000e+00,-3.100000000000000e-02} 0 : (+5.368752311919240e-01 +0.000000000000000e+00*i) +1 : (-3.474752311919241e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.100000000000000e-02 Eigenvalues of linearized matrix around x = {+1.036343142385000e+00,+0.000000000000000e+00,-3.149999999999999e-02} 0 : (+5.373371504022791e-01 +0.000000000000000e+00*i) +1 : (-3.479371504022791e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.149999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.149999999999999e-02 Eigenvalues of linearized matrix around x = {+1.036877434282000e+00,+0.000000000000000e+00,-3.199999999999999e-02} 0 : (+5.377979686012724e-01 +0.000000000000000e+00*i) +1 : (-3.483979686012724e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.199999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.199999999999999e-02 Eigenvalues of linearized matrix around x = {+1.037410564315000e+00,+0.000000000000000e+00,-3.249999999999999e-02} 0 : (+5.382576924146623e-01 +0.000000000000000e+00*i) +1 : (-3.488576924146622e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.249999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.249999999999999e-02 Eigenvalues of linearized matrix around x = {+1.037942539071000e+00,+0.000000000000000e+00,-3.299999999999999e-02} 0 : (+5.387163284090044e-01 +0.000000000000000e+00*i) +1 : (-3.493163284090044e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.299999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.299999999999999e-02 Eigenvalues of linearized matrix around x = {+1.038473365070000e+00,+0.000000000000000e+00,-3.350000000000000e-02} 0 : (+5.391738830823313e-01 +0.000000000000000e+00*i) +1 : (-3.497738830823313e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.350000000000000e-02 Eigenvalues of linearized matrix around x = {+1.039003048778000e+00,+0.000000000000000e+00,-3.400000000000000e-02} 0 : (+5.396303628755265e-01 +0.000000000000000e+00*i) +1 : (-3.502303628755264e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.400000000000000e-02 Eigenvalues of linearized matrix around x = {+1.039531596597000e+00,+0.000000000000000e+00,-3.450000000000000e-02} 0 : (+5.400857741638644e-01 +0.000000000000000e+00*i) +1 : (-3.506857741638644e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.450000000000000e-02 Eigenvalues of linearized matrix around x = {+1.040059014874000e+00,+0.000000000000000e+00,-3.500000000000000e-02} 0 : (+5.405401232649270e-01 +0.000000000000000e+00*i) +1 : (-3.511401232649271e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.500000000000000e-02 Eigenvalues of linearized matrix around x = {+1.040585309898000e+00,+0.000000000000000e+00,-3.550000000000000e-02} 0 : (+5.409934164361716e-01 +0.000000000000000e+00*i) +1 : (-3.515934164361716e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.550000000000000e-02 Eigenvalues of linearized matrix around x = {+1.041110487899000e+00,+0.000000000000000e+00,-3.600000000000000e-02} 0 : (+5.414456598742245e-01 +0.000000000000000e+00*i) +1 : (-3.520456598742246e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.600000000000000e-02 Eigenvalues of linearized matrix around x = {+1.041634555053000e+00,+0.000000000000000e+00,-3.650000000000000e-02} 0 : (+5.418968597193377e-01 +0.000000000000000e+00*i) +1 : (-3.524968597193376e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.650000000000000e-02 Eigenvalues of linearized matrix around x = {+1.042157517479000e+00,+0.000000000000000e+00,-3.700000000000000e-02} 0 : (+5.423470220529513e-01 +0.000000000000000e+00*i) +1 : (-3.529470220529513e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.700000000000000e-02 Eigenvalues of linearized matrix around x = {+1.042679381243000e+00,+0.000000000000000e+00,-3.750000000000000e-02} 0 : (+5.427961529012846e-01 +0.000000000000000e+00*i) +1 : (-3.533961529012846e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.750000000000000e-02 Eigenvalues of linearized matrix around x = {+1.043200152356000e+00,+0.000000000000000e+00,-3.800000000000000e-02} 0 : (+5.432442582337546e-01 +0.000000000000000e+00*i) +1 : (-3.538442582337546e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.800000000000000e-02 Eigenvalues of linearized matrix around x = {+1.043719836774000e+00,+0.000000000000000e+00,-3.850000000000000e-02} 0 : (+5.436913439631185e-01 +0.000000000000000e+00*i) +1 : (-3.542913439631183e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.850000000000000e-02 Eigenvalues of linearized matrix around x = {+1.044238440404000e+00,+0.000000000000000e+00,-3.900000000000000e-02} 0 : (+5.441374159507718e-01 +0.000000000000000e+00*i) +1 : (-3.547374159507719e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.900000000000000e-02 Eigenvalues of linearized matrix around x = {+1.044755969097000e+00,+0.000000000000000e+00,-3.949999999999999e-02} 0 : (+5.445824800008632e-01 +0.000000000000000e+00*i) +1 : (-3.551824800008632e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.949999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.949999999999999e-02 Eigenvalues of linearized matrix around x = {+1.045272428654000e+00,+0.000000000000000e+00,-3.999999999999999e-02} 0 : (+5.450265418655877e-01 +0.000000000000000e+00*i) +1 : (-3.556265418655878e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.999999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -3.999999999999999e-02 Eigenvalues of linearized matrix around x = {+1.045787824826000e+00,+0.000000000000000e+00,-4.049999999999999e-02} 0 : (+5.454696072453178e-01 +0.000000000000000e+00*i) +1 : (-3.560696072453178e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.049999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.049999999999999e-02 Eigenvalues of linearized matrix around x = {+1.046302163313000e+00,+0.000000000000000e+00,-4.099999999999999e-02} 0 : (+5.459116817878703e-01 +0.000000000000000e+00*i) +1 : (-3.565116817878703e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.099999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.099999999999999e-02 Eigenvalues of linearized matrix around x = {+1.046815449765000e+00,+0.000000000000000e+00,-4.150000000000000e-02} 0 : (+5.463527710894950e-01 +0.000000000000000e+00*i) +1 : (-3.569527710894950e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.150000000000000e-02 Eigenvalues of linearized matrix around x = {+1.047327689784000e+00,+0.000000000000000e+00,-4.200000000000000e-02} 0 : (+5.467928806967153e-01 +0.000000000000000e+00*i) +1 : (-3.573928806967153e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.200000000000000e-02 Eigenvalues of linearized matrix around x = {+1.047838888923000e+00,+0.000000000000000e+00,-4.250000000000000e-02} 0 : (+5.472320161055927e-01 +0.000000000000000e+00*i) +1 : (-3.578320161055928e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.250000000000000e-02 Eigenvalues of linearized matrix around x = {+1.048349052686000e+00,+0.000000000000000e+00,-4.300000000000000e-02} 0 : (+5.476701827618462e-01 +0.000000000000000e+00*i) +1 : (-3.582701827618462e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.300000000000000e-02 Eigenvalues of linearized matrix around x = {+1.048858186531000e+00,+0.000000000000000e+00,-4.350000000000000e-02} 0 : (+5.481073860635476e-01 +0.000000000000000e+00*i) +1 : (-3.587073860635476e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.350000000000000e-02 Eigenvalues of linearized matrix around x = {+1.049366295870000e+00,+0.000000000000000e+00,-4.400000000000000e-02} 0 : (+5.485436313612374e-01 +0.000000000000000e+00*i) +1 : (-3.591436313612374e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.400000000000000e-02 Eigenvalues of linearized matrix around x = {+1.049873386067000e+00,+0.000000000000000e+00,-4.450000000000000e-02} 0 : (+5.489789239563212e-01 +0.000000000000000e+00*i) +1 : (-3.595789239563212e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.450000000000000e-02 Eigenvalues of linearized matrix around x = {+1.050379462442000e+00,+0.000000000000000e+00,-4.500000000000000e-02} 0 : (+5.494132691046163e-01 +0.000000000000000e+00*i) +1 : (-3.600132691046162e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.500000000000000e-02 Eigenvalues of linearized matrix around x = {+1.050884530268000e+00,+0.000000000000000e+00,-4.550000000000000e-02} 0 : (+5.498466720138873e-01 +0.000000000000000e+00*i) +1 : (-3.604466720138874e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.550000000000000e-02 Eigenvalues of linearized matrix around x = {+1.051388594776000e+00,+0.000000000000000e+00,-4.600000000000000e-02} 0 : (+5.502791378482462e-01 +0.000000000000000e+00*i) +1 : (-3.608791378482463e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.600000000000000e-02 Eigenvalues of linearized matrix around x = {+1.051891661151000e+00,+0.000000000000000e+00,-4.650000000000000e-02} 0 : (+5.507106717248251e-01 +0.000000000000000e+00*i) +1 : (-3.613106717248251e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.650000000000000e-02 Eigenvalues of linearized matrix around x = {+1.052393734534000e+00,+0.000000000000000e+00,-4.699999999999999e-02} 0 : (+5.511412787155997e-01 +0.000000000000000e+00*i) +1 : (-3.617412787155997e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.699999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.699999999999999e-02 Eigenvalues of linearized matrix around x = {+1.052894820025000e+00,+0.000000000000000e+00,-4.749999999999999e-02} 0 : (+5.515709638500640e-01 +0.000000000000000e+00*i) +1 : (-3.621709638500639e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.749999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.749999999999999e-02 Eigenvalues of linearized matrix around x = {+1.053394922680000e+00,+0.000000000000000e+00,-4.799999999999999e-02} 0 : (+5.519997321127600e-01 +0.000000000000000e+00*i) +1 : (-3.625997321127600e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.799999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.799999999999999e-02 Eigenvalues of linearized matrix around x = {+1.053894047514000e+00,+0.000000000000000e+00,-4.849999999999999e-02} 0 : (+5.524275884459501e-01 +0.000000000000000e+00*i) +1 : (-3.630275884459500e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.849999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.849999999999999e-02 Eigenvalues of linearized matrix around x = {+1.054392199500000e+00,+0.000000000000000e+00,-4.899999999999999e-02} 0 : (+5.528545377488570e-01 +0.000000000000000e+00*i) +1 : (-3.634545377488569e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.899999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.899999999999999e-02 Eigenvalues of linearized matrix around x = {+1.054889383569000e+00,+0.000000000000000e+00,-4.950000000000000e-02} 0 : (+5.532805848777628e-01 +0.000000000000000e+00*i) +1 : (-3.638805848777628e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -4.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -4.950000000000000e-02 Eigenvalues of linearized matrix around x = {+1.055385604612000e+00,+0.000000000000000e+00,-5.000000000000000e-02} 0 : (+5.537057346478169e-01 +0.000000000000000e+00*i) +1 : (-3.643057346478170e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.000000000000000e-02 Eigenvalues of linearized matrix around x = {+1.055880867482000e+00,+0.000000000000000e+00,-5.050000000000000e-02} 0 : (+5.541299918348439e-01 +0.000000000000000e+00*i) +1 : (-3.647299918348439e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.050000000000000e-02 Eigenvalues of linearized matrix around x = {+1.056375176988000e+00,+0.000000000000000e+00,-5.100000000000000e-02} 0 : (+5.545533611702943e-01 +0.000000000000000e+00*i) +1 : (-3.651533611702943e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.100000000000000e-02 Eigenvalues of linearized matrix around x = {+1.056868537903000e+00,+0.000000000000000e+00,-5.150000000000000e-02} 0 : (+5.549758473481908e-01 +0.000000000000000e+00*i) +1 : (-3.655758473481908e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.150000000000000e-02 Eigenvalues of linearized matrix around x = {+1.057360954961000e+00,+0.000000000000000e+00,-5.200000000000000e-02} 0 : (+5.553974550226459e-01 +0.000000000000000e+00*i) +1 : (-3.659974550226459e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.200000000000000e-02 Eigenvalues of linearized matrix around x = {+1.057852432856000e+00,+0.000000000000000e+00,-5.250000000000000e-02} 0 : (+5.558181888070942e-01 +0.000000000000000e+00*i) +1 : (-3.664181888070942e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.250000000000000e-02 Eigenvalues of linearized matrix around x = {+1.058342976245000e+00,+0.000000000000000e+00,-5.300000000000000e-02} 0 : (+5.562380532769480e-01 +0.000000000000000e+00*i) +1 : (-3.668380532769480e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.300000000000000e-02 Eigenvalues of linearized matrix around x = {+1.058832589749000e+00,+0.000000000000000e+00,-5.350000000000000e-02} 0 : (+5.566570529705381e-01 +0.000000000000000e+00*i) +1 : (-3.672570529705382e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.350000000000000e-02 Eigenvalues of linearized matrix around x = {+1.059321277950000e+00,+0.000000000000000e+00,-5.400000000000000e-02} 0 : (+5.570751923866297e-01 +0.000000000000000e+00*i) +1 : (-3.676751923866297e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.400000000000000e-02 Eigenvalues of linearized matrix around x = {+1.059809045392000e+00,+0.000000000000000e+00,-5.450000000000000e-02} 0 : (+5.574924759853617e-01 +0.000000000000000e+00*i) +1 : (-3.680924759853617e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.450000000000000e-02 Eigenvalues of linearized matrix around x = {+1.060295896587000e+00,+0.000000000000000e+00,-5.499999999999999e-02} 0 : (+5.579089081934612e-01 +0.000000000000000e+00*i) +1 : (-3.685089081934612e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.499999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.499999999999999e-02 Eigenvalues of linearized matrix around x = {+1.060781836007000e+00,+0.000000000000000e+00,-5.549999999999999e-02} 0 : (+5.583244933974791e-01 +0.000000000000000e+00*i) +1 : (-3.689244933974792e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.549999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.549999999999999e-02 Eigenvalues of linearized matrix around x = {+1.061266868091000e+00,+0.000000000000000e+00,-5.599999999999999e-02} 0 : (+5.587392359498581e-01 +0.000000000000000e+00*i) +1 : (-3.693392359498581e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.599999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.599999999999999e-02 Eigenvalues of linearized matrix around x = {+1.061750997242000e+00,+0.000000000000000e+00,-5.649999999999999e-02} 0 : (+5.591531401664424e-01 +0.000000000000000e+00*i) +1 : (-3.697531401664425e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.649999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.649999999999999e-02 Eigenvalues of linearized matrix around x = {+1.062234227829000e+00,+0.000000000000000e+00,-5.700000000000000e-02} 0 : (+5.595662103282655e-01 +0.000000000000000e+00*i) +1 : (-3.701662103282655e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.700000000000000e-02 Eigenvalues of linearized matrix around x = {+1.062716564185000e+00,+0.000000000000000e+00,-5.750000000000000e-02} 0 : (+5.599784506799158e-01 +0.000000000000000e+00*i) +1 : (-3.705784506799158e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.750000000000000e-02 Eigenvalues of linearized matrix around x = {+1.063198010610000e+00,+0.000000000000000e+00,-5.800000000000000e-02} 0 : (+5.603898654321748e-01 +0.000000000000000e+00*i) +1 : (-3.709898654321748e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.800000000000000e-02 Eigenvalues of linearized matrix around x = {+1.063678571372000e+00,+0.000000000000000e+00,-5.850000000000000e-02} 0 : (+5.608004587629446e-01 +0.000000000000000e+00*i) +1 : (-3.714004587629447e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.850000000000000e-02 Eigenvalues of linearized matrix around x = {+1.064158250704000e+00,+0.000000000000000e+00,-5.900000000000000e-02} 0 : (+5.612102348147558e-01 +0.000000000000000e+00*i) +1 : (-3.718102348147557e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.900000000000000e-02 Eigenvalues of linearized matrix around x = {+1.064637052805000e+00,+0.000000000000000e+00,-5.950000000000000e-02} 0 : (+5.616191976956934e-01 +0.000000000000000e+00*i) +1 : (-3.722191976956934e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -5.950000000000000e-02 Eigenvalues of linearized matrix around x = {+1.065114981845000e+00,+0.000000000000000e+00,-6.000000000000000e-02} 0 : (+5.620273514837377e-01 +0.000000000000000e+00*i) +1 : (-3.726273514837377e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.000000000000000e-02 Eigenvalues of linearized matrix around x = {+1.065592041959000e+00,+0.000000000000000e+00,-6.050000000000000e-02} 0 : (+5.624347002217078e-01 +0.000000000000000e+00*i) +1 : (-3.730347002217078e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.050000000000000e-02 Eigenvalues of linearized matrix around x = {+1.066068237251000e+00,+0.000000000000000e+00,-6.100000000000000e-02} 0 : (+5.628412479207454e-01 +0.000000000000000e+00*i) +1 : (-3.734412479207455e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.100000000000000e-02 Eigenvalues of linearized matrix around x = {+1.066543571794000e+00,+0.000000000000000e+00,-6.150000000000000e-02} 0 : (+5.632469985603815e-01 +0.000000000000000e+00*i) +1 : (-3.738469985603815e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.150000000000000e-02 Eigenvalues of linearized matrix around x = {+1.067018049629000e+00,+0.000000000000000e+00,-6.200000000000000e-02} 0 : (+5.636519560877480e-01 +0.000000000000000e+00*i) +1 : (-3.742519560877481e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.200000000000000e-02 Eigenvalues of linearized matrix around x = {+1.067491674767000e+00,+0.000000000000000e+00,-6.250000000000000e-02} 0 : (+5.640561244193504e-01 +0.000000000000000e+00*i) +1 : (-3.746561244193505e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.250000000000000e-02 Eigenvalues of linearized matrix around x = {+1.067964451187000e+00,+0.000000000000000e+00,-6.299999999999999e-02} 0 : (+5.644595074394240e-01 +0.000000000000000e+00*i) +1 : (-3.750595074394240e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.299999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.299999999999999e-02 Eigenvalues of linearized matrix around x = {+1.068436382841000e+00,+0.000000000000000e+00,-6.349999999999999e-02} 0 : (+5.648621090042626e-01 +0.000000000000000e+00*i) +1 : (-3.754621090042626e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.349999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.349999999999999e-02 Eigenvalues of linearized matrix around x = {+1.068907473648000e+00,+0.000000000000000e+00,-6.399999999999999e-02} 0 : (+5.652639329371623e-01 +0.000000000000000e+00*i) +1 : (-3.758639329371622e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.399999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.399999999999999e-02 Eigenvalues of linearized matrix around x = {+1.069377727498000e+00,+0.000000000000000e+00,-6.449999999999999e-02} 0 : (+5.656649830318939e-01 +0.000000000000000e+00*i) +1 : (-3.762649830318939e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.449999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.449999999999999e-02 Eigenvalues of linearized matrix around x = {+1.069847148254000e+00,+0.000000000000000e+00,-6.499999999999999e-02} 0 : (+5.660652630544702e-01 +0.000000000000000e+00*i) +1 : (-3.766652630544702e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.499999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.499999999999999e-02 Eigenvalues of linearized matrix around x = {+1.070315739747000e+00,+0.000000000000000e+00,-6.549999999999999e-02} 0 : (+5.664647767389388e-01 +0.000000000000000e+00*i) +1 : (-3.770647767389388e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.549999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.549999999999999e-02 Eigenvalues of linearized matrix around x = {+1.070783505782000e+00,+0.000000000000000e+00,-6.599999999999999e-02} 0 : (+5.668635277925588e-01 +0.000000000000000e+00*i) +1 : (-3.774635277925588e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.599999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.599999999999999e-02 Eigenvalues of linearized matrix around x = {+1.071250450134000e+00,+0.000000000000000e+00,-6.649999999999999e-02} 0 : (+5.672615198924460e-01 +0.000000000000000e+00*i) +1 : (-3.778615198924461e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.649999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.649999999999999e-02 Eigenvalues of linearized matrix around x = {+1.071716576550000e+00,+0.000000000000000e+00,-6.699999999999999e-02} 0 : (+5.676587566873367e-01 +0.000000000000000e+00*i) +1 : (-3.782587566873367e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.699999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.699999999999999e-02 Eigenvalues of linearized matrix around x = {+1.072181888750000e+00,+0.000000000000000e+00,-6.749999999999999e-02} 0 : (+5.680552417984938e-01 +0.000000000000000e+00*i) +1 : (-3.786552417984939e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.749999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.749999999999999e-02 Eigenvalues of linearized matrix around x = {+1.072646390426000e+00,+0.000000000000000e+00,-6.799999999999999e-02} 0 : (+5.684509788189110e-01 +0.000000000000000e+00*i) +1 : (-3.790509788189110e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.799999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.799999999999999e-02 Eigenvalues of linearized matrix around x = {+1.073110085245000e+00,+0.000000000000000e+00,-6.849999999999999e-02} 0 : (+5.688459713159217e-01 +0.000000000000000e+00*i) +1 : (-3.794459713159217e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.849999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.849999999999999e-02 Eigenvalues of linearized matrix around x = {+1.073572976843000e+00,+0.000000000000000e+00,-6.899999999999999e-02} 0 : (+5.692402228261420e-01 +0.000000000000000e+00*i) +1 : (-3.798402228261419e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.899999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.899999999999999e-02 Eigenvalues of linearized matrix around x = {+1.074035068832000e+00,+0.000000000000000e+00,-6.949999999999999e-02} 0 : (+5.696337368614863e-01 +0.000000000000000e+00*i) +1 : (-3.802337368614863e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.949999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.949999999999999e-02 Eigenvalues of linearized matrix around x = {+1.074496364798000e+00,+0.000000000000000e+00,-6.999999999999999e-02} 0 : (+5.700265169075150e-01 +0.000000000000000e+00*i) +1 : (-3.806265169075150e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -6.999999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -6.999999999999999e-02 Eigenvalues of linearized matrix around x = {+1.074956868299000e+00,+0.000000000000000e+00,-7.049999999999999e-02} 0 : (+5.704185664217829e-01 +0.000000000000000e+00*i) +1 : (-3.810185664217829e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.049999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.049999999999999e-02 Eigenvalues of linearized matrix around x = {+1.075416582870000e+00,+0.000000000000000e+00,-7.099999999999999e-02} 0 : (+5.708098888381471e-01 +0.000000000000000e+00*i) +1 : (-3.814098888381471e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.099999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.099999999999999e-02 Eigenvalues of linearized matrix around x = {+1.075875512017000e+00,+0.000000000000000e+00,-7.149999999999999e-02} 0 : (+5.712004875617078e-01 +0.000000000000000e+00*i) +1 : (-3.818004875617078e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.149999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.149999999999999e-02 Eigenvalues of linearized matrix around x = {+1.076333659223000e+00,+0.000000000000000e+00,-7.199999999999999e-02} 0 : (+5.715903659739668e-01 +0.000000000000000e+00*i) +1 : (-3.821903659739669e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.199999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.199999999999999e-02 Eigenvalues of linearized matrix around x = {+1.076791027945000e+00,+0.000000000000000e+00,-7.250000000000000e-02} 0 : (+5.719795274303204e-01 +0.000000000000000e+00*i) +1 : (-3.825795274303205e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.250000000000000e-02 Eigenvalues of linearized matrix around x = {+1.077247621617000e+00,+0.000000000000000e+00,-7.300000000000000e-02} 0 : (+5.723679752626609e-01 +0.000000000000000e+00*i) +1 : (-3.829679752626610e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.300000000000000e-02 Eigenvalues of linearized matrix around x = {+1.077703443645000e+00,+0.000000000000000e+00,-7.350000000000000e-02} 0 : (+5.727557127751693e-01 +0.000000000000000e+00*i) +1 : (-3.833557127751693e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.350000000000000e-02 Eigenvalues of linearized matrix around x = {+1.078158497413000e+00,+0.000000000000000e+00,-7.400000000000000e-02} 0 : (+5.731427432494665e-01 +0.000000000000000e+00*i) +1 : (-3.837427432494664e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.400000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.400000000000000e-02 Eigenvalues of linearized matrix around x = {+1.078612786282000e+00,+0.000000000000000e+00,-7.450000000000000e-02} 0 : (+5.735290699438076e-01 +0.000000000000000e+00*i) +1 : (-3.841290699438076e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.450000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.450000000000000e-02 Eigenvalues of linearized matrix around x = {+1.079066313586000e+00,+0.000000000000000e+00,-7.500000000000000e-02} 0 : (+5.739146960897256e-01 +0.000000000000000e+00*i) +1 : (-3.845146960897254e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.500000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.500000000000000e-02 Eigenvalues of linearized matrix around x = {+1.079519082638000e+00,+0.000000000000000e+00,-7.550000000000000e-02} 0 : (+5.742996248971777e-01 +0.000000000000000e+00*i) +1 : (-3.848996248971778e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.550000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.550000000000000e-02 Eigenvalues of linearized matrix around x = {+1.079971096727000e+00,+0.000000000000000e+00,-7.600000000000000e-02} 0 : (+5.746838595520393e-01 +0.000000000000000e+00*i) +1 : (-3.852838595520393e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.600000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.600000000000000e-02 Eigenvalues of linearized matrix around x = {+1.080422359117000e+00,+0.000000000000000e+00,-7.650000000000000e-02} 0 : (+5.750674032152956e-01 +0.000000000000000e+00*i) +1 : (-3.856674032152956e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.650000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.650000000000000e-02 Eigenvalues of linearized matrix around x = {+1.080872873053000e+00,+0.000000000000000e+00,-7.700000000000000e-02} 0 : (+5.754502590281864e-01 +0.000000000000000e+00*i) +1 : (-3.860502590281862e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.700000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.700000000000000e-02 Eigenvalues of linearized matrix around x = {+1.081322641753000e+00,+0.000000000000000e+00,-7.750000000000000e-02} 0 : (+5.758324301054464e-01 +0.000000000000000e+00*i) +1 : (-3.864324301054465e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.750000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.750000000000000e-02 Eigenvalues of linearized matrix around x = {+1.081771668415000e+00,+0.000000000000000e+00,-7.800000000000000e-02} 0 : (+5.762139195412981e-01 +0.000000000000000e+00*i) +1 : (-3.868139195412981e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.800000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.800000000000000e-02 Eigenvalues of linearized matrix around x = {+1.082219956214000e+00,+0.000000000000000e+00,-7.849999999999999e-02} 0 : (+5.765947304069420e-01 +0.000000000000000e+00*i) +1 : (-3.871947304069421e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.849999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.849999999999999e-02 Eigenvalues of linearized matrix around x = {+1.082667508304000e+00,+0.000000000000000e+00,-7.899999999999999e-02} 0 : (+5.769748657522961e-01 +0.000000000000000e+00*i) +1 : (-3.875748657522962e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.899999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.899999999999999e-02 Eigenvalues of linearized matrix around x = {+1.083114327815000e+00,+0.000000000000000e+00,-7.949999999999999e-02} 0 : (+5.773543286034879e-01 +0.000000000000000e+00*i) +1 : (-3.879543286034880e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.949999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.949999999999999e-02 Eigenvalues of linearized matrix around x = {+1.083560417858000e+00,+0.000000000000000e+00,-7.999999999999999e-02} 0 : (+5.777331219671403e-01 +0.000000000000000e+00*i) +1 : (-3.883331219671403e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -7.999999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -7.999999999999999e-02 Eigenvalues of linearized matrix around x = {+1.084005781520000e+00,+0.000000000000000e+00,-8.049999999999999e-02} 0 : (+5.781112488261643e-01 +0.000000000000000e+00*i) +1 : (-3.887112488261644e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.049999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.049999999999999e-02 Eigenvalues of linearized matrix around x = {+1.084450421870000e+00,+0.000000000000000e+00,-8.099999999999999e-02} 0 : (+5.784887121448916e-01 +0.000000000000000e+00*i) +1 : (-3.890887121448916e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.099999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.099999999999999e-02 Eigenvalues of linearized matrix around x = {+1.084894341951000e+00,+0.000000000000000e+00,-8.149999999999999e-02} 0 : (+5.788655148623209e-01 +0.000000000000000e+00*i) +1 : (-3.894655148623208e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.149999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.149999999999999e-02 Eigenvalues of linearized matrix around x = {+1.085337544791000e+00,+0.000000000000000e+00,-8.199999999999999e-02} 0 : (+5.792416599014926e-01 +0.000000000000000e+00*i) +1 : (-3.898416599014926e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.199999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.199999999999999e-02 Eigenvalues of linearized matrix around x = {+1.085780033393000e+00,+0.000000000000000e+00,-8.249999999999999e-02} 0 : (+5.796171501610380e-01 +0.000000000000000e+00*i) +1 : (-3.902171501610380e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.249999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.249999999999999e-02 Eigenvalues of linearized matrix around x = {+1.086221810741000e+00,+0.000000000000000e+00,-8.299999999999999e-02} 0 : (+5.799919885203075e-01 +0.000000000000000e+00*i) +1 : (-3.905919885203075e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.299999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.299999999999999e-02 Eigenvalues of linearized matrix around x = {+1.086662879801000e+00,+0.000000000000000e+00,-8.349999999999999e-02} 0 : (+5.803661778402545e-01 +0.000000000000000e+00*i) +1 : (-3.909661778402544e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.349999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.349999999999999e-02 Eigenvalues of linearized matrix around x = {+1.087103243514000e+00,+0.000000000000000e+00,-8.399999999999999e-02} 0 : (+5.807397209575320e-01 +0.000000000000000e+00*i) +1 : (-3.913397209575320e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.399999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.399999999999999e-02 Eigenvalues of linearized matrix around x = {+1.087542904806000e+00,+0.000000000000000e+00,-8.449999999999999e-02} 0 : (+5.811126206930116e-01 +0.000000000000000e+00*i) +1 : (-3.917126206930116e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.449999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.449999999999999e-02 Eigenvalues of linearized matrix around x = {+1.087981866580000e+00,+0.000000000000000e+00,-8.499999999999999e-02} 0 : (+5.814848798450304e-01 +0.000000000000000e+00*i) +1 : (-3.920848798450304e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.499999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.499999999999999e-02 Eigenvalues of linearized matrix around x = {+1.088420131722000e+00,+0.000000000000000e+00,-8.549999999999999e-02} 0 : (+5.818565011945152e-01 +0.000000000000000e+00*i) +1 : (-3.924565011945151e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.549999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.549999999999999e-02 Eigenvalues of linearized matrix around x = {+1.088857703098000e+00,+0.000000000000000e+00,-8.599999999999999e-02} 0 : (+5.822274875024704e-01 +0.000000000000000e+00*i) +1 : (-3.928274875024704e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.599999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.599999999999999e-02 Eigenvalues of linearized matrix around x = {+1.089294583553000e+00,+0.000000000000000e+00,-8.649999999999999e-02} 0 : (+5.825978415091652e-01 +0.000000000000000e+00*i) +1 : (-3.931978415091650e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.649999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.649999999999999e-02 Eigenvalues of linearized matrix around x = {+1.089730775914000e+00,+0.000000000000000e+00,-8.699999999999999e-02} 0 : (+5.829675659367077e-01 +0.000000000000000e+00*i) +1 : (-3.935675659367076e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.699999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.699999999999999e-02 Eigenvalues of linearized matrix around x = {+1.090166282992000e+00,+0.000000000000000e+00,-8.749999999999999e-02} 0 : (+5.833366634907742e-01 +0.000000000000000e+00*i) +1 : (-3.939366634907743e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.749999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.749999999999999e-02 Eigenvalues of linearized matrix around x = {+1.090601107576000e+00,+0.000000000000000e+00,-8.799999999999999e-02} 0 : (+5.837051368555537e-01 +0.000000000000000e+00*i) +1 : (-3.943051368555537e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.799999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.799999999999999e-02 Eigenvalues of linearized matrix around x = {+1.091035252437000e+00,+0.000000000000000e+00,-8.850000000000000e-02} 0 : (+5.840729886971707e-01 +0.000000000000000e+00*i) +1 : (-3.946729886971707e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.850000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.850000000000000e-02 Eigenvalues of linearized matrix around x = {+1.091468720328000e+00,+0.000000000000000e+00,-8.900000000000000e-02} 0 : (+5.844402216637155e-01 +0.000000000000000e+00*i) +1 : (-3.950402216637154e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.900000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.900000000000000e-02 Eigenvalues of linearized matrix around x = {+1.091901513987000e+00,+0.000000000000000e+00,-8.950000000000000e-02} 0 : (+5.848068383878170e-01 +0.000000000000000e+00*i) +1 : (-3.954068383878170e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -8.950000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -8.950000000000000e-02 Eigenvalues of linearized matrix around x = {+1.092333636128000e+00,+0.000000000000000e+00,-9.000000000000000e-02} 0 : (+5.851728414790476e-01 +0.000000000000000e+00*i) +1 : (-3.957728414790475e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.000000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.000000000000000e-02 Eigenvalues of linearized matrix around x = {+1.092765089453000e+00,+0.000000000000000e+00,-9.050000000000000e-02} 0 : (+5.855382335341186e-01 +0.000000000000000e+00*i) +1 : (-3.961382335341187e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.050000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.050000000000000e-02 Eigenvalues of linearized matrix around x = {+1.093195876643000e+00,+0.000000000000000e+00,-9.100000000000000e-02} 0 : (+5.859030171292868e-01 +0.000000000000000e+00*i) +1 : (-3.965030171292869e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.100000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.100000000000000e-02 Eigenvalues of linearized matrix around x = {+1.093626000363000e+00,+0.000000000000000e+00,-9.150000000000000e-02} 0 : (+5.862671948246176e-01 +0.000000000000000e+00*i) +1 : (-3.968671948246176e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.150000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.150000000000000e-02 Eigenvalues of linearized matrix around x = {+1.094055463260000e+00,+0.000000000000000e+00,-9.200000000000000e-02} 0 : (+5.866307691623203e-01 +0.000000000000000e+00*i) +1 : (-3.972307691623204e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.200000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.200000000000000e-02 Eigenvalues of linearized matrix around x = {+1.094484267964000e+00,+0.000000000000000e+00,-9.250000000000000e-02} 0 : (+5.869937426676231e-01 +0.000000000000000e+00*i) +1 : (-3.975937426676232e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.250000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.250000000000000e-02 Eigenvalues of linearized matrix around x = {+1.094912417088000e+00,+0.000000000000000e+00,-9.300000000000000e-02} 0 : (+5.873561178488013e-01 +0.000000000000000e+00*i) +1 : (-3.979561178488012e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.300000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.300000000000000e-02 Eigenvalues of linearized matrix around x = {+1.095339913229000e+00,+0.000000000000000e+00,-9.350000000000000e-02} 0 : (+5.877178971980511e-01 +0.000000000000000e+00*i) +1 : (-3.983178971980510e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.350000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.350000000000000e-02 Eigenvalues of linearized matrix around x = {+1.095766758965000e+00,+0.000000000000000e+00,-9.399999999999999e-02} 0 : (+5.880790831889779e-01 +0.000000000000000e+00*i) +1 : (-3.986790831889780e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.399999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.399999999999999e-02 Eigenvalues of linearized matrix around x = {+1.096192956861000e+00,+0.000000000000000e+00,-9.449999999999999e-02} 0 : (+5.884396782817007e-01 +0.000000000000000e+00*i) +1 : (-3.990396782817008e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.449999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.449999999999999e-02 Eigenvalues of linearized matrix around x = {+1.096618509463000e+00,+0.000000000000000e+00,-9.499999999999999e-02} 0 : (+5.887996849178021e-01 +0.000000000000000e+00*i) +1 : (-3.993996849178020e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.499999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.499999999999999e-02 Eigenvalues of linearized matrix around x = {+1.097043419301000e+00,+0.000000000000000e+00,-9.549999999999999e-02} 0 : (+5.891591055228915e-01 +0.000000000000000e+00*i) +1 : (-3.997591055228915e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.549999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.549999999999999e-02 Eigenvalues of linearized matrix around x = {+1.097467688890000e+00,+0.000000000000000e+00,-9.599999999999999e-02} 0 : (+5.895179425074790e-01 +0.000000000000000e+00*i) +1 : (-4.001179425074791e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.599999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.599999999999999e-02 Eigenvalues of linearized matrix around x = {+1.097891320729000e+00,+0.000000000000000e+00,-9.649999999999999e-02} 0 : (+5.898761982661535e-01 +0.000000000000000e+00*i) +1 : (-4.004761982661535e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.649999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.649999999999999e-02 Eigenvalues of linearized matrix around x = {+1.098314317298000e+00,+0.000000000000000e+00,-9.699999999999999e-02} 0 : (+5.902338751750714e-01 +0.000000000000000e+00*i) +1 : (-4.008338751750714e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.699999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.699999999999999e-02 Eigenvalues of linearized matrix around x = {+1.098736681067000e+00,+0.000000000000000e+00,-9.749999999999999e-02} 0 : (+5.905909755995928e-01 +0.000000000000000e+00*i) +1 : (-4.011909755995929e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.749999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.749999999999999e-02 Eigenvalues of linearized matrix around x = {+1.099158414485000e+00,+0.000000000000000e+00,-9.799999999999999e-02} 0 : (+5.909475018850047e-01 +0.000000000000000e+00*i) +1 : (-4.015475018850047e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.799999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.799999999999999e-02 Eigenvalues of linearized matrix around x = {+1.099579519989000e+00,+0.000000000000000e+00,-9.849999999999999e-02} 0 : (+5.913034563641537e-01 +0.000000000000000e+00*i) +1 : (-4.019034563641538e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.849999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.849999999999999e-02 Eigenvalues of linearized matrix around x = {+1.100000000000000e+00,+0.000000000000000e+00,-9.899999999999999e-02} 0 : (+5.916588413540905e-01 +0.000000000000000e+00*i) +1 : (-4.022588413540905e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.899999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.899999999999999e-02 Eigenvalues of linearized matrix around x = {+1.100419856923000e+00,+0.000000000000000e+00,-9.949999999999999e-02} 0 : (+5.920136591560921e-01 +0.000000000000000e+00*i) +1 : (-4.026136591560920e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.949999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.949999999999999e-02 Eigenvalues of linearized matrix around x = {+1.100839093149000e+00,+0.000000000000000e+00,-9.999999999999999e-02} 0 : (+5.923679120573757e-01 +0.000000000000000e+00*i) +1 : (-4.029679120573757e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -9.999999999999999e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -9.999999999999999e-02 Eigenvalues of linearized matrix around x = {+1.101257711053000e+00,+0.000000000000000e+00,-1.005000000000000e-01} 0 : (+5.927216023294331e-01 +0.000000000000000e+00*i) +1 : (-4.033216023294330e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.005000000000000e-01 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.005000000000000e-01 Eigenvalues of linearized matrix around x = {+1.101675712996000e+00,+0.000000000000000e+00,-1.010000000000000e-01} 0 : (+5.930747322297422e-01 +0.000000000000000e+00*i) +1 : (-4.036747322297422e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.010000000000000e-01 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.010000000000000e-01 Eigenvalues of linearized matrix around x = {+1.102093101325000e+00,+0.000000000000000e+00,-1.015000000000000e-01} 0 : (+5.934273040017904e-01 +0.000000000000000e+00*i) +1 : (-4.040273040017903e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.015000000000000e-01 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = -1.015000000000000e-01