Eigenvalues of linearized matrix around x = {-2.037188190782000e-01,+0.000000000000000e+00,+9.900000000000000e-02} 0 : (+5.090114016117657e-01 +0.000000000000000e+00*i) +1 : (-3.196114016117657e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.900000000000000e-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 = +9.900000000000000e-02 Eigenvalues of linearized matrix around x = {-2.030416486649000e-01,+0.000000000000000e+00,+9.845000000000001e-02} 0 : (+5.084192623201009e-01 +0.000000000000000e+00*i) +1 : (-3.190192623201008e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.845000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.845000000000001e-02 Eigenvalues of linearized matrix around x = {-2.023624261401000e-01,+0.000000000000000e+00,+9.790000000000000e-02} 0 : (+5.078251450290002e-01 +0.000000000000000e+00*i) +1 : (-3.184251450290002e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.790000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.790000000000000e-02 Eigenvalues of linearized matrix around x = {-2.016811350769000e-01,+0.000000000000000e+00,+9.735000000000001e-02} 0 : (+5.072290328988447e-01 +0.000000000000000e+00*i) +1 : (-3.178290328988447e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.735000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.735000000000001e-02 Eigenvalues of linearized matrix around x = {-2.009977588323000e-01,+0.000000000000000e+00,+9.680000000000001e-02} 0 : (+5.066309088583527e-01 +0.000000000000000e+00*i) +1 : (-3.172309088583527e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.680000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.680000000000001e-02 Eigenvalues of linearized matrix around x = {-2.003122805439000e-01,+0.000000000000000e+00,+9.625000000000000e-02} 0 : (+5.060307556007585e-01 +0.000000000000000e+00*i) +1 : (-3.166307556007585e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.625000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.625000000000000e-02 Eigenvalues of linearized matrix around x = {-1.996246831249000e-01,+0.000000000000000e+00,+9.570000000000001e-02} 0 : (+5.054285555784770e-01 +0.000000000000000e+00*i) +1 : (-3.160285555784770e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.570000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.570000000000001e-02 Eigenvalues of linearized matrix around x = {-1.989349492607000e-01,+0.000000000000000e+00,+9.515000000000001e-02} 0 : (+5.048242909991438e-01 +0.000000000000000e+00*i) +1 : (-3.154242909991438e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.515000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.515000000000001e-02 Eigenvalues of linearized matrix around x = {-1.982430614045000e-01,+0.000000000000000e+00,+9.460000000000000e-02} 0 : (+5.042179438207526e-01 +0.000000000000000e+00*i) +1 : (-3.148179438207526e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.460000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.460000000000000e-02 Eigenvalues of linearized matrix around x = {-1.975490017724000e-01,+0.000000000000000e+00,+9.405000000000001e-02} 0 : (+5.036094957463265e-01 +0.000000000000000e+00*i) +1 : (-3.142094957463266e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.405000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.405000000000001e-02 Eigenvalues of linearized matrix around x = {-1.968527523399000e-01,+0.000000000000000e+00,+9.350000000000001e-02} 0 : (+5.029989282197890e-01 +0.000000000000000e+00*i) +1 : (-3.135989282197891e-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 = {-1.961542948364000e-01,+0.000000000000000e+00,+9.295000000000000e-02} 0 : (+5.023862224200509e-01 +0.000000000000000e+00*i) +1 : (-3.129862224200509e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.295000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.295000000000000e-02 Eigenvalues of linearized matrix around x = {-1.954536107410000e-01,+0.000000000000000e+00,+9.240000000000001e-02} 0 : (+5.017713592562079e-01 +0.000000000000000e+00*i) +1 : (-3.123713592562078e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.240000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.240000000000001e-02 Eigenvalues of linearized matrix around x = {-1.947506812776000e-01,+0.000000000000000e+00,+9.185000000000000e-02} 0 : (+5.011543193620922e-01 +0.000000000000000e+00*i) +1 : (-3.117543193620922e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.185000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.185000000000000e-02 Eigenvalues of linearized matrix around x = {-1.940454874102000e-01,+0.000000000000000e+00,+9.130000000000001e-02} 0 : (+5.005350830909684e-01 +0.000000000000000e+00*i) +1 : (-3.111350830909684e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.130000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.130000000000001e-02 Eigenvalues of linearized matrix around x = {-1.933380098374000e-01,+0.000000000000000e+00,+9.075000000000001e-02} 0 : (+4.999136305094930e-01 +0.000000000000000e+00*i) +1 : (-3.105136305094930e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.075000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.075000000000001e-02 Eigenvalues of linearized matrix around x = {-1.926282289876000e-01,+0.000000000000000e+00,+9.020000000000000e-02} 0 : (+4.992899413922540e-01 +0.000000000000000e+00*i) +1 : (-3.098899413922541e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.020000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +9.020000000000000e-02 Eigenvalues of linearized matrix around x = {-1.919161250135000e-01,+0.000000000000000e+00,+8.965000000000001e-02} 0 : (+4.986639952156608e-01 +0.000000000000000e+00*i) +1 : (-3.092639952156609e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.965000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.965000000000001e-02 Eigenvalues of linearized matrix around x = {-1.912016777869000e-01,+0.000000000000000e+00,+8.910000000000001e-02} 0 : (+4.980357711520605e-01 +0.000000000000000e+00*i) +1 : (-3.086357711520605e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.910000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.910000000000001e-02 Eigenvalues of linearized matrix around x = {-1.904848668929000e-01,+0.000000000000000e+00,+8.855000000000000e-02} 0 : (+4.974052480632894e-01 +0.000000000000000e+00*i) +1 : (-3.080052480632895e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.855000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.855000000000000e-02 Eigenvalues of linearized matrix around x = {-1.897656716244000e-01,+0.000000000000000e+00,+8.800000000000001e-02} 0 : (+4.967724044944489e-01 +0.000000000000000e+00*i) +1 : (-3.073724044944490e-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 = {-1.890440709761000e-01,+0.000000000000000e+00,+8.745000000000001e-02} 0 : (+4.961372186672008e-01 +0.000000000000000e+00*i) +1 : (-3.067372186672009e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.745000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.745000000000001e-02 Eigenvalues of linearized matrix around x = {-1.883200436383000e-01,+0.000000000000000e+00,+8.690000000000001e-02} 0 : (+4.954996684728453e-01 +0.000000000000000e+00*i) +1 : (-3.060996684728454e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.690000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.690000000000001e-02 Eigenvalues of linearized matrix around x = {-1.875935679915000e-01,+0.000000000000000e+00,+8.635000000000001e-02} 0 : (+4.948597314660595e-01 +0.000000000000000e+00*i) +1 : (-3.054597314660596e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.635000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.635000000000001e-02 Eigenvalues of linearized matrix around x = {-1.868646220989000e-01,+0.000000000000000e+00,+8.580000000000000e-02} 0 : (+4.942173848567429e-01 +0.000000000000000e+00*i) +1 : (-3.048173848567429e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.580000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.580000000000000e-02 Eigenvalues of linearized matrix around x = {-1.861331837012000e-01,+0.000000000000000e+00,+8.525000000000001e-02} 0 : (+4.935726055038410e-01 +0.000000000000000e+00*i) +1 : (-3.041726055038411e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.525000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.525000000000001e-02 Eigenvalues of linearized matrix around x = {-1.853992302087000e-01,+0.000000000000000e+00,+8.470000000000001e-02} 0 : (+4.929253699067440e-01 +0.000000000000000e+00*i) +1 : (-3.035253699067441e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.470000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.470000000000001e-02 Eigenvalues of linearized matrix around x = {-1.846627386956000e-01,+0.000000000000000e+00,+8.415000000000000e-02} 0 : (+4.922756541985734e-01 +0.000000000000000e+00*i) +1 : (-3.028756541985735e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.415000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.415000000000000e-02 Eigenvalues of linearized matrix around x = {-1.839236858921000e-01,+0.000000000000000e+00,+8.360000000000001e-02} 0 : (+4.916234341374788e-01 +0.000000000000000e+00*i) +1 : (-3.022234341374789e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.360000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.360000000000001e-02 Eigenvalues of linearized matrix around x = {-1.831820481776000e-01,+0.000000000000000e+00,+8.305000000000001e-02} 0 : (+4.909686850988510e-01 +0.000000000000000e+00*i) +1 : (-3.015686850988511e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.305000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.305000000000001e-02 Eigenvalues of linearized matrix around x = {-1.824378015734000e-01,+0.000000000000000e+00,+8.250000000000000e-02} 0 : (+4.903113820670395e-01 +0.000000000000000e+00*i) +1 : (-3.009113820670396e-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 = {-1.816909217346000e-01,+0.000000000000000e+00,+8.195000000000001e-02} 0 : (+4.896514996263074e-01 +0.000000000000000e+00*i) +1 : (-3.002514996263075e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.195000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.195000000000001e-02 Eigenvalues of linearized matrix around x = {-1.809413839430000e-01,+0.000000000000000e+00,+8.140000000000000e-02} 0 : (+4.889890119526093e-01 +0.000000000000000e+00*i) +1 : (-2.995890119526093e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.140000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.140000000000000e-02 Eigenvalues of linearized matrix around x = {-1.801891630984000e-01,+0.000000000000000e+00,+8.085000000000001e-02} 0 : (+4.883238928038961e-01 +0.000000000000000e+00*i) +1 : (-2.989238928038962e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.085000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.085000000000001e-02 Eigenvalues of linearized matrix around x = {-1.794342337108000e-01,+0.000000000000000e+00,+8.030000000000001e-02} 0 : (+4.876561155111512e-01 +0.000000000000000e+00*i) +1 : (-2.982561155111512e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.030000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +8.030000000000001e-02 Eigenvalues of linearized matrix around x = {-1.786765698916000e-01,+0.000000000000000e+00,+7.975000000000000e-02} 0 : (+4.869856529684774e-01 +0.000000000000000e+00*i) +1 : (-2.975856529684775e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.975000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.975000000000000e-02 Eigenvalues of linearized matrix around x = {-1.779161453451000e-01,+0.000000000000000e+00,+7.920000000000001e-02} 0 : (+4.863124776233811e-01 +0.000000000000000e+00*i) +1 : (-2.969124776233812e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.920000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.920000000000001e-02 Eigenvalues of linearized matrix around x = {-1.771529333596000e-01,+0.000000000000000e+00,+7.865000000000001e-02} 0 : (+4.856365614666330e-01 +0.000000000000000e+00*i) +1 : (-2.962365614666331e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.865000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.865000000000001e-02 Eigenvalues of linearized matrix around x = {-1.763869067978000e-01,+0.000000000000000e+00,+7.810000000000000e-02} 0 : (+4.849578760214346e-01 +0.000000000000000e+00*i) +1 : (-2.955578760214347e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.810000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.810000000000000e-02 Eigenvalues of linearized matrix around x = {-1.756180380879000e-01,+0.000000000000000e+00,+7.755000000000001e-02} 0 : (+4.842763923331313e-01 +0.000000000000000e+00*i) +1 : (-2.948763923331314e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.755000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.755000000000001e-02 Eigenvalues of linearized matrix around x = {-1.748462992131000e-01,+0.000000000000000e+00,+7.700000000000001e-02} 0 : (+4.835920809574272e-01 +0.000000000000000e+00*i) +1 : (-2.941920809574273e-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 = {-1.740716617024000e-01,+0.000000000000000e+00,+7.645000000000000e-02} 0 : (+4.829049119496723e-01 +0.000000000000000e+00*i) +1 : (-2.935049119496724e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.645000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.645000000000000e-02 Eigenvalues of linearized matrix around x = {-1.732940966194000e-01,+0.000000000000000e+00,+7.590000000000001e-02} 0 : (+4.822148548522913e-01 +0.000000000000000e+00*i) +1 : (-2.928148548522913e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.590000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.590000000000001e-02 Eigenvalues of linearized matrix around x = {-1.725135745524000e-01,+0.000000000000000e+00,+7.535000000000000e-02} 0 : (+4.815218786832770e-01 +0.000000000000000e+00*i) +1 : (-2.921218786832770e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.535000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.535000000000000e-02 Eigenvalues of linearized matrix around x = {-1.717300656032000e-01,+0.000000000000000e+00,+7.480000000000001e-02} 0 : (+4.808259519234412e-01 +0.000000000000000e+00*i) +1 : (-2.914259519234413e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.480000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.480000000000001e-02 Eigenvalues of linearized matrix around x = {-1.709435393755000e-01,+0.000000000000000e+00,+7.425000000000001e-02} 0 : (+4.801270425032134e-01 +0.000000000000000e+00*i) +1 : (-2.907270425032135e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.425000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.425000000000001e-02 Eigenvalues of linearized matrix around x = {-1.701539649639000e-01,+0.000000000000000e+00,+7.370000000000000e-02} 0 : (+4.794251177898756e-01 +0.000000000000000e+00*i) +1 : (-2.900251177898757e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.370000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.370000000000000e-02 Eigenvalues of linearized matrix around x = {-1.693613109414000e-01,+0.000000000000000e+00,+7.315000000000001e-02} 0 : (+4.787201445733618e-01 +0.000000000000000e+00*i) +1 : (-2.893201445733619e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.315000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.315000000000001e-02 Eigenvalues of linearized matrix around x = {-1.685655453473000e-01,+0.000000000000000e+00,+7.260000000000001e-02} 0 : (+4.780120890523067e-01 +0.000000000000000e+00*i) +1 : (-2.886120890523068e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.260000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.260000000000001e-02 Eigenvalues of linearized matrix around x = {-1.677666356746000e-01,+0.000000000000000e+00,+7.205000000000000e-02} 0 : (+4.773009168195397e-01 +0.000000000000000e+00*i) +1 : (-2.879009168195398e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.205000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.205000000000000e-02 Eigenvalues of linearized matrix around x = {-1.669645488566000e-01,+0.000000000000000e+00,+7.150000000000001e-02} 0 : (+4.765865928467518e-01 +0.000000000000000e+00*i) +1 : (-2.871865928467519e-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 = {-1.661592512540000e-01,+0.000000000000000e+00,+7.095000000000001e-02} 0 : (+4.758690814694890e-01 +0.000000000000000e+00*i) +1 : (-2.864690814694891e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.095000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.095000000000001e-02 Eigenvalues of linearized matrix around x = {-1.653507086401000e-01,+0.000000000000000e+00,+7.040000000000000e-02} 0 : (+4.751483463703292e-01 +0.000000000000000e+00*i) +1 : (-2.857483463703293e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.040000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.040000000000000e-02 Eigenvalues of linearized matrix around x = {-1.645388861874000e-01,+0.000000000000000e+00,+6.985000000000001e-02} 0 : (+4.744243505631764e-01 +0.000000000000000e+00*i) +1 : (-2.850243505631765e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.985000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.985000000000001e-02 Eigenvalues of linearized matrix around x = {-1.637237484521000e-01,+0.000000000000000e+00,+6.930000000000000e-02} 0 : (+4.736970563755502e-01 +0.000000000000000e+00*i) +1 : (-2.842970563755502e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.930000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.930000000000000e-02 Eigenvalues of linearized matrix around x = {-1.629052593590000e-01,+0.000000000000000e+00,+6.875000000000001e-02} 0 : (+4.729664254310893e-01 +0.000000000000000e+00*i) +1 : (-2.835664254310894e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.875000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.875000000000001e-02 Eigenvalues of linearized matrix around x = {-1.620833821860000e-01,+0.000000000000000e+00,+6.820000000000001e-02} 0 : (+4.722324186315551e-01 +0.000000000000000e+00*i) +1 : (-2.828324186315552e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.820000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.820000000000001e-02 Eigenvalues of linearized matrix around x = {-1.612580795475000e-01,+0.000000000000000e+00,+6.765000000000000e-02} 0 : (+4.714949961376991e-01 +0.000000000000000e+00*i) +1 : (-2.820949961376992e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.765000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.765000000000000e-02 Eigenvalues of linearized matrix around x = {-1.604293133779000e-01,+0.000000000000000e+00,+6.710000000000001e-02} 0 : (+4.707541173500626e-01 +0.000000000000000e+00*i) +1 : (-2.813541173500627e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.710000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.710000000000001e-02 Eigenvalues of linearized matrix around x = {-1.595970449139000e-01,+0.000000000000000e+00,+6.655000000000001e-02} 0 : (+4.700097408885381e-01 +0.000000000000000e+00*i) +1 : (-2.806097408885382e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.655000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.655000000000001e-02 Eigenvalues of linearized matrix around x = {-1.587612346770000e-01,+0.000000000000000e+00,+6.600000000000000e-02} 0 : (+4.692618245719380e-01 +0.000000000000000e+00*i) +1 : (-2.798618245719381e-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 = {-1.579218424544000e-01,+0.000000000000000e+00,+6.545000000000001e-02} 0 : (+4.685103253959519e-01 +0.000000000000000e+00*i) +1 : (-2.791103253959520e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.545000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.545000000000001e-02 Eigenvalues of linearized matrix around x = {-1.570788272806000e-01,+0.000000000000000e+00,+6.490000000000001e-02} 0 : (+4.677551995115430e-01 +0.000000000000000e+00*i) +1 : (-2.783551995115430e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.490000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.490000000000001e-02 Eigenvalues of linearized matrix around x = {-1.562321474170000e-01,+0.000000000000000e+00,+6.435000000000000e-02} 0 : (+4.669964022013594e-01 +0.000000000000000e+00*i) +1 : (-2.775964022013594e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.435000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.435000000000000e-02 Eigenvalues of linearized matrix around x = {-1.553817603318000e-01,+0.000000000000000e+00,+6.380000000000001e-02} 0 : (+4.662338878562080e-01 +0.000000000000000e+00*i) +1 : (-2.768338878562081e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.380000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.380000000000001e-02 Eigenvalues of linearized matrix around x = {-1.545276226786000e-01,+0.000000000000000e+00,+6.325000000000000e-02} 0 : (+4.654676099501517e-01 +0.000000000000000e+00*i) +1 : (-2.760676099501518e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.325000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.325000000000000e-02 Eigenvalues of linearized matrix around x = {-1.536696902750000e-01,+0.000000000000000e+00,+6.270000000000001e-02} 0 : (+4.646975210153828e-01 +0.000000000000000e+00*i) +1 : (-2.752975210153829e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.270000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.270000000000001e-02 Eigenvalues of linearized matrix around x = {-1.528079180793000e-01,+0.000000000000000e+00,+6.215000000000000e-02} 0 : (+4.639235726151596e-01 +0.000000000000000e+00*i) +1 : (-2.745235726151597e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.215000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.215000000000000e-02 Eigenvalues of linearized matrix around x = {-1.519422601674000e-01,+0.000000000000000e+00,+6.160000000000000e-02} 0 : (+4.631457153166783e-01 +0.000000000000000e+00*i) +1 : (-2.737457153166783e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.160000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.160000000000000e-02 Eigenvalues of linearized matrix around x = {-1.510726697088000e-01,+0.000000000000000e+00,+6.105000000000000e-02} 0 : (+4.623638986628827e-01 +0.000000000000000e+00*i) +1 : (-2.729638986628828e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.105000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +6.105000000000000e-02 Eigenvalues of linearized matrix around x = {-1.501990989410000e-01,+0.000000000000000e+00,+6.050000000000001e-02} 0 : (+4.615780711425704e-01 +0.000000000000000e+00*i) +1 : (-2.721780711425705e-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 = {-1.493214991438000e-01,+0.000000000000000e+00,+5.995000000000000e-02} 0 : (+4.607881801601291e-01 +0.000000000000000e+00*i) +1 : (-2.713881801601291e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.995000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.995000000000000e-02 Eigenvalues of linearized matrix around x = {-1.484398206122000e-01,+0.000000000000000e+00,+5.940000000000000e-02} 0 : (+4.599941720037226e-01 +0.000000000000000e+00*i) +1 : (-2.705941720037227e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.940000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.940000000000000e-02 Eigenvalues of linearized matrix around x = {-1.475540126287000e-01,+0.000000000000000e+00,+5.885000000000001e-02} 0 : (+4.591959918126320e-01 +0.000000000000000e+00*i) +1 : (-2.697959918126321e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.885000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.885000000000001e-02 Eigenvalues of linearized matrix around x = {-1.466640234339000e-01,+0.000000000000000e+00,+5.830000000000000e-02} 0 : (+4.583935835427451e-01 +0.000000000000000e+00*i) +1 : (-2.689935835427452e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.830000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.830000000000000e-02 Eigenvalues of linearized matrix around x = {-1.457698001969000e-01,+0.000000000000000e+00,+5.775000000000000e-02} 0 : (+4.575868899315301e-01 +0.000000000000000e+00*i) +1 : (-2.681868899315302e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.775000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.775000000000000e-02 Eigenvalues of linearized matrix around x = {-1.448712889839000e-01,+0.000000000000000e+00,+5.720000000000000e-02} 0 : (+4.567758524610361e-01 +0.000000000000000e+00*i) +1 : (-2.673758524610362e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.720000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.720000000000000e-02 Eigenvalues of linearized matrix around x = {-1.439684347260000e-01,+0.000000000000000e+00,+5.665000000000001e-02} 0 : (+4.559604113198023e-01 +0.000000000000000e+00*i) +1 : (-2.665604113198023e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.665000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.665000000000001e-02 Eigenvalues of linearized matrix around x = {-1.430611811856000e-01,+0.000000000000000e+00,+5.610000000000000e-02} 0 : (+4.551405053631173e-01 +0.000000000000000e+00*i) +1 : (-2.657405053631174e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.610000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.610000000000000e-02 Eigenvalues of linearized matrix around x = {-1.421494709214000e-01,+0.000000000000000e+00,+5.555000000000000e-02} 0 : (+4.543160720716086e-01 +0.000000000000000e+00*i) +1 : (-2.649160720716086e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.555000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.555000000000000e-02 Eigenvalues of linearized matrix around x = {-1.412332452527000e-01,+0.000000000000000e+00,+5.500000000000000e-02} 0 : (+4.534870475087716e-01 +0.000000000000000e+00*i) +1 : (-2.640870475087718e-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 = {-1.403124442213000e-01,+0.000000000000000e+00,+5.445000000000001e-02} 0 : (+4.526533662758842e-01 +0.000000000000000e+00*i) +1 : (-2.632533662758842e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.445000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.445000000000001e-02 Eigenvalues of linearized matrix around x = {-1.393870065527000e-01,+0.000000000000000e+00,+5.390000000000000e-02} 0 : (+4.518149614658135e-01 +0.000000000000000e+00*i) +1 : (-2.624149614658136e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.390000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.390000000000000e-02 Eigenvalues of linearized matrix around x = {-1.384568696156000e-01,+0.000000000000000e+00,+5.335000000000000e-02} 0 : (+4.509717646147933e-01 +0.000000000000000e+00*i) +1 : (-2.615717646147935e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.335000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.335000000000000e-02 Eigenvalues of linearized matrix around x = {-1.375219693792000e-01,+0.000000000000000e+00,+5.280000000000001e-02} 0 : (+4.501237056516858e-01 +0.000000000000000e+00*i) +1 : (-2.607237056516858e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.280000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.280000000000001e-02 Eigenvalues of linearized matrix around x = {-1.365822403700000e-01,+0.000000000000000e+00,+5.225000000000000e-02} 0 : (+4.492707128462432e-01 +0.000000000000000e+00*i) +1 : (-2.598707128462433e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.225000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.225000000000000e-02 Eigenvalues of linearized matrix around x = {-1.356376156255000e-01,+0.000000000000000e+00,+5.170000000000000e-02} 0 : (+4.484127127539841e-01 +0.000000000000000e+00*i) +1 : (-2.590127127539843e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.170000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.170000000000000e-02 Eigenvalues of linearized matrix around x = {-1.346880266470000e-01,+0.000000000000000e+00,+5.115000000000000e-02} 0 : (+4.475496301596443e-01 +0.000000000000000e+00*i) +1 : (-2.581496301596444e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.115000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.115000000000000e-02 Eigenvalues of linearized matrix around x = {-1.337334033496000e-01,+0.000000000000000e+00,+5.060000000000001e-02} 0 : (+4.466813880174463e-01 +0.000000000000000e+00*i) +1 : (-2.572813880174463e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.060000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.060000000000001e-02 Eigenvalues of linearized matrix around x = {-1.327736740111000e-01,+0.000000000000000e+00,+5.005000000000000e-02} 0 : (+4.458079073896962e-01 +0.000000000000000e+00*i) +1 : (-2.564079073896963e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.005000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +5.005000000000000e-02 Eigenvalues of linearized matrix around x = {-1.318087652179000e-01,+0.000000000000000e+00,+4.950000000000000e-02} 0 : (+4.449291073819429e-01 +0.000000000000000e+00*i) +1 : (-2.555291073819430e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.950000000000000e-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 = {-1.308386018091000e-01,+0.000000000000000e+00,+4.895000000000000e-02} 0 : (+4.440449050757490e-01 +0.000000000000000e+00*i) +1 : (-2.546449050757491e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.895000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.895000000000000e-02 Eigenvalues of linearized matrix around x = {-1.298631068178000e-01,+0.000000000000000e+00,+4.840000000000001e-02} 0 : (+4.431552154581228e-01 +0.000000000000000e+00*i) +1 : (-2.537552154581229e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.840000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.840000000000001e-02 Eigenvalues of linearized matrix around x = {-1.288822014102000e-01,+0.000000000000000e+00,+4.785000000000000e-02} 0 : (+4.422599513481086e-01 +0.000000000000000e+00*i) +1 : (-2.528599513481086e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.785000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.785000000000000e-02 Eigenvalues of linearized matrix around x = {-1.278958048218000e-01,+0.000000000000000e+00,+4.730000000000000e-02} 0 : (+4.413590233198518e-01 +0.000000000000000e+00*i) +1 : (-2.519590233198519e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.730000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.730000000000000e-02 Eigenvalues of linearized matrix around x = {-1.269038342912000e-01,+0.000000000000000e+00,+4.675000000000001e-02} 0 : (+4.404523396225411e-01 +0.000000000000000e+00*i) +1 : (-2.510523396225411e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.675000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.675000000000001e-02 Eigenvalues of linearized matrix around x = {-1.259062049902000e-01,+0.000000000000000e+00,+4.620000000000000e-02} 0 : (+4.395398060959850e-01 +0.000000000000000e+00*i) +1 : (-2.501398060959851e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.620000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.620000000000000e-02 Eigenvalues of linearized matrix around x = {-1.249028299515000e-01,+0.000000000000000e+00,+4.565000000000000e-02} 0 : (+4.386213260829517e-01 +0.000000000000000e+00*i) +1 : (-2.492213260829518e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.565000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.565000000000000e-02 Eigenvalues of linearized matrix around x = {-1.238936199926000e-01,+0.000000000000000e+00,+4.510000000000000e-02} 0 : (+4.376968003369280e-01 +0.000000000000000e+00*i) +1 : (-2.482968003369281e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.510000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.510000000000000e-02 Eigenvalues of linearized matrix around x = {-1.228784836365000e-01,+0.000000000000000e+00,+4.455000000000001e-02} 0 : (+4.367661269257793e-01 +0.000000000000000e+00*i) +1 : (-2.473661269257794e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.455000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.455000000000001e-02 Eigenvalues of linearized matrix around x = {-1.218573270284000e-01,+0.000000000000000e+00,+4.400000000000000e-02} 0 : (+4.358292011305039e-01 +0.000000000000000e+00*i) +1 : (-2.464292011305040e-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 = {-1.208300538491000e-01,+0.000000000000000e+00,+4.345000000000000e-02} 0 : (+4.348859153396475e-01 +0.000000000000000e+00*i) +1 : (-2.454859153396476e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.345000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.345000000000000e-02 Eigenvalues of linearized matrix around x = {-1.197965652235000e-01,+0.000000000000000e+00,+4.290000000000000e-02} 0 : (+4.339361589378246e-01 +0.000000000000000e+00*i) +1 : (-2.445361589378246e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.290000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.290000000000000e-02 Eigenvalues of linearized matrix around x = {-1.187567596251000e-01,+0.000000000000000e+00,+4.235000000000001e-02} 0 : (+4.329798181890848e-01 +0.000000000000000e+00*i) +1 : (-2.435798181890849e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.235000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.235000000000001e-02 Eigenvalues of linearized matrix around x = {-1.177105327763000e-01,+0.000000000000000e+00,+4.180000000000000e-02} 0 : (+4.320167761148446e-01 +0.000000000000000e+00*i) +1 : (-2.426167761148447e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.180000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.180000000000000e-02 Eigenvalues of linearized matrix around x = {-1.166577775426000e-01,+0.000000000000000e+00,+4.125000000000000e-02} 0 : (+4.310469123645336e-01 +0.000000000000000e+00*i) +1 : (-2.416469123645337e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.125000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.125000000000000e-02 Eigenvalues of linearized matrix around x = {-1.155983838233000e-01,+0.000000000000000e+00,+4.070000000000000e-02} 0 : (+4.300701030812368e-01 +0.000000000000000e+00*i) +1 : (-2.406701030812369e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.070000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.070000000000000e-02 Eigenvalues of linearized matrix around x = {-1.145322384350000e-01,+0.000000000000000e+00,+4.015000000000001e-02} 0 : (+4.290862207588091e-01 +0.000000000000000e+00*i) +1 : (-2.396862207588092e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.015000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +4.015000000000001e-02 Eigenvalues of linearized matrix around x = {-1.134592249903000e-01,+0.000000000000000e+00,+3.960000000000000e-02} 0 : (+4.280951340925415e-01 +0.000000000000000e+00*i) +1 : (-2.386951340925416e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.960000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.960000000000000e-02 Eigenvalues of linearized matrix around x = {-1.123792237700000e-01,+0.000000000000000e+00,+3.905000000000000e-02} 0 : (+4.270967078216760e-01 +0.000000000000000e+00*i) +1 : (-2.376967078216761e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.905000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.905000000000000e-02 Eigenvalues of linearized matrix around x = {-1.112921115883000e-01,+0.000000000000000e+00,+3.850000000000001e-02} 0 : (+4.260908025631574e-01 +0.000000000000000e+00*i) +1 : (-2.366908025631574e-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 = {-1.101977616519000e-01,+0.000000000000000e+00,+3.795000000000000e-02} 0 : (+4.250772746372931e-01 +0.000000000000000e+00*i) +1 : (-2.356772746372932e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.795000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.795000000000000e-02 Eigenvalues of linearized matrix around x = {-1.090960434105000e-01,+0.000000000000000e+00,+3.740000000000000e-02} 0 : (+4.240559758828363e-01 +0.000000000000000e+00*i) +1 : (-2.346559758828363e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.740000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.740000000000000e-02 Eigenvalues of linearized matrix around x = {-1.079868223997000e-01,+0.000000000000000e+00,+3.685000000000000e-02} 0 : (+4.230267534622280e-01 +0.000000000000000e+00*i) +1 : (-2.336267534622280e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.685000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.685000000000000e-02 Eigenvalues of linearized matrix around x = {-1.068699600761000e-01,+0.000000000000000e+00,+3.630000000000001e-02} 0 : (+4.219894496566125e-01 +0.000000000000000e+00*i) +1 : (-2.325894496566126e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.630000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.630000000000001e-02 Eigenvalues of linearized matrix around x = {-1.057453136421000e-01,+0.000000000000000e+00,+3.575000000000000e-02} 0 : (+4.209439016480885e-01 +0.000000000000000e+00*i) +1 : (-2.315439016480886e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.575000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.575000000000000e-02 Eigenvalues of linearized matrix around x = {-1.046127358619000e-01,+0.000000000000000e+00,+3.520000000000000e-02} 0 : (+4.198899412903465e-01 +0.000000000000000e+00*i) +1 : (-2.304899412903465e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.520000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.520000000000000e-02 Eigenvalues of linearized matrix around x = {-1.034720748665000e-01,+0.000000000000000e+00,+3.465000000000000e-02} 0 : (+4.188273948653942e-01 +0.000000000000000e+00*i) +1 : (-2.294273948653942e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.465000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.465000000000000e-02 Eigenvalues of linearized matrix around x = {-1.023231739483000e-01,+0.000000000000000e+00,+3.410000000000001e-02} 0 : (+4.177560828266455e-01 +0.000000000000000e+00*i) +1 : (-2.283560828266455e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.410000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.410000000000001e-02 Eigenvalues of linearized matrix around x = {-1.011658713432000e-01,+0.000000000000000e+00,+3.355000000000000e-02} 0 : (+4.166758195261149e-01 +0.000000000000000e+00*i) +1 : (-2.272758195261150e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.355000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.355000000000000e-02 Eigenvalues of linearized matrix around x = {-9.999999999999999e-02,+0.000000000000000e+00,+3.300000000000000e-02} 0 : (+4.155864129251969e-01 +0.000000000000000e+00*i) +1 : (-2.261864129251970e-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 = {-9.882538733674000e-02,+0.000000000000000e+00,+3.245000000000001e-02} 0 : (+4.144876642883356e-01 +0.000000000000000e+00*i) +1 : (-2.250876642883357e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.245000000000001e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.245000000000001e-02 Eigenvalues of linearized matrix around x = {-9.764185498168999e-02,+0.000000000000000e+00,+3.190000000000000e-02} 0 : (+4.133793678570523e-01 +0.000000000000000e+00*i) +1 : (-2.239793678570524e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.190000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.190000000000000e-02 Eigenvalues of linearized matrix around x = {-9.644921849898999e-02,+0.000000000000000e+00,+3.135000000000000e-02} 0 : (+4.122613105039005e-01 +0.000000000000000e+00*i) +1 : (-2.228613105039006e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.135000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.135000000000000e-02 Eigenvalues of linearized matrix around x = {-9.524728709725000e-02,+0.000000000000000e+00,+3.080000000000000e-02} 0 : (+4.111332713642982e-01 +0.000000000000000e+00*i) +1 : (-2.217332713642983e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.080000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.080000000000000e-02 Eigenvalues of linearized matrix around x = {-9.403586331991000e-02,+0.000000000000000e+00,+3.025000000000000e-02} 0 : (+4.099950214445977e-01 +0.000000000000000e+00*i) +1 : (-2.205950214445977e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.025000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +3.025000000000000e-02 Eigenvalues of linearized matrix around x = {-9.281474271605999e-02,+0.000000000000000e+00,+2.970000000000000e-02} 0 : (+4.088463232046141e-01 +0.000000000000000e+00*i) +1 : (-2.194463232046142e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.970000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.970000000000000e-02 Eigenvalues of linearized matrix around x = {-9.158371348998000e-02,+0.000000000000000e+00,+2.915000000000000e-02} 0 : (+4.076869301123598e-01 +0.000000000000000e+00*i) +1 : (-2.182869301123599e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.915000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.915000000000000e-02 Eigenvalues of linearized matrix around x = {-9.034255612785000e-02,+0.000000000000000e+00,+2.860000000000000e-02} 0 : (+4.065165861688506e-01 +0.000000000000000e+00*i) +1 : (-2.171165861688507e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.860000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.860000000000000e-02 Eigenvalues of linearized matrix around x = {-8.909104299982999e-02,+0.000000000000000e+00,+2.805000000000000e-02} 0 : (+4.053350254005445e-01 +0.000000000000000e+00*i) +1 : (-2.159350254005445e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.805000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.805000000000000e-02 Eigenvalues of linearized matrix around x = {-8.782893793527999e-02,+0.000000000000000e+00,+2.750000000000000e-02} 0 : (+4.041419713164941e-01 +0.000000000000000e+00*i) +1 : (-2.147419713164941e-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 = {-8.655599576911999e-02,+0.000000000000000e+00,+2.695000000000000e-02} 0 : (+4.029371363274191e-01 +0.000000000000000e+00*i) +1 : (-2.135371363274192e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.695000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.695000000000000e-02 Eigenvalues of linearized matrix around x = {-8.527196185670999e-02,+0.000000000000000e+00,+2.640000000000000e-02} 0 : (+4.017202211232285e-01 +0.000000000000000e+00*i) +1 : (-2.123202211232286e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.640000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.640000000000000e-02 Eigenvalues of linearized matrix around x = {-8.397657155466000e-02,+0.000000000000000e+00,+2.585000000000000e-02} 0 : (+4.004909140054390e-01 +0.000000000000000e+00*i) +1 : (-2.110909140054390e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.585000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.585000000000000e-02 Eigenvalues of linearized matrix around x = {-8.266954966458000e-02,+0.000000000000000e+00,+2.530000000000000e-02} 0 : (+3.992488901704373e-01 +0.000000000000000e+00*i) +1 : (-2.098488901704373e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.530000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.530000000000000e-02 Eigenvalues of linearized matrix around x = {-8.135060983636000e-02,+0.000000000000000e+00,+2.475000000000000e-02} 0 : (+3.979938109389992e-01 +0.000000000000000e+00*i) +1 : (-2.085938109389993e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.475000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.475000000000000e-02 Eigenvalues of linearized matrix around x = {-8.001945392757000e-02,+0.000000000000000e+00,+2.420000000000000e-02} 0 : (+3.967253229273226e-01 +0.000000000000000e+00*i) +1 : (-2.073253229273226e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.420000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.420000000000000e-02 Eigenvalues of linearized matrix around x = {-7.867577131475000e-02,+0.000000000000000e+00,+2.365000000000000e-02} 0 : (+3.954430571538810e-01 +0.000000000000000e+00*i) +1 : (-2.060430571538810e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.365000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.365000000000000e-02 Eigenvalues of linearized matrix around x = {-7.731923815217000e-02,+0.000000000000000e+00,+2.310000000000000e-02} 0 : (+3.941466280760242e-01 +0.000000000000000e+00*i) +1 : (-2.047466280760243e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.310000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.310000000000000e-02 Eigenvalues of linearized matrix around x = {-7.594951657318000e-02,+0.000000000000000e+00,+2.255000000000000e-02} 0 : (+3.928356325495935e-01 +0.000000000000000e+00*i) +1 : (-2.034356325495936e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.255000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.255000000000000e-02 Eigenvalues of linearized matrix around x = {-7.456625382847000e-02,+0.000000000000000e+00,+2.200000000000000e-02} 0 : (+3.915096487037992e-01 +0.000000000000000e+00*i) +1 : (-2.021096487037993e-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 = {-7.316908135514999e-02,+0.000000000000000e+00,+2.145000000000000e-02} 0 : (+3.901682347229325e-01 +0.000000000000000e+00*i) +1 : (-2.007682347229325e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.145000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.145000000000000e-02 Eigenvalues of linearized matrix around x = {-7.175761376973999e-02,+0.000000000000000e+00,+2.090000000000000e-02} 0 : (+3.888109275253667e-01 +0.000000000000000e+00*i) +1 : (-1.994109275253668e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.090000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.090000000000000e-02 Eigenvalues of linearized matrix around x = {-7.033144777719000e-02,+0.000000000000000e+00,+2.035000000000000e-02} 0 : (+3.874372413289989e-01 +0.000000000000000e+00*i) +1 : (-1.980372413289990e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.035000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +2.035000000000000e-02 Eigenvalues of linearized matrix around x = {-6.889016098751999e-02,+0.000000000000000e+00,+1.980000000000000e-02} 0 : (+3.860466660913446e-01 +0.000000000000000e+00*i) +1 : (-1.966466660913447e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.980000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.980000000000000e-02 Eigenvalues of linearized matrix around x = {-6.743331062996000e-02,+0.000000000000000e+00,+1.925000000000000e-02} 0 : (+3.846386658103586e-01 +0.000000000000000e+00*i) +1 : (-1.952386658103586e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.925000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.925000000000000e-02 Eigenvalues of linearized matrix around x = {-6.596043215387000e-02,+0.000000000000000e+00,+1.870000000000000e-02} 0 : (+3.832126766709095e-01 +0.000000000000000e+00*i) +1 : (-1.938126766709096e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.870000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.870000000000000e-02 Eigenvalues of linearized matrix around x = {-6.447103770382000e-02,+0.000000000000000e+00,+1.815000000000000e-02} 0 : (+3.817681050193455e-01 +0.000000000000000e+00*i) +1 : (-1.923681050193456e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.815000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.815000000000000e-02 Eigenvalues of linearized matrix around x = {-6.296461445476999e-02,+0.000000000000000e+00,+1.760000000000000e-02} 0 : (+3.803043251464380e-01 +0.000000000000000e+00*i) +1 : (-1.909043251464381e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.760000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.760000000000000e-02 Eigenvalues of linearized matrix around x = {-6.144062279138000e-02,+0.000000000000000e+00,+1.705000000000000e-02} 0 : (+3.788206768562576e-01 +0.000000000000000e+00*i) +1 : (-1.894206768562577e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.705000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.705000000000000e-02 Eigenvalues of linearized matrix around x = {-5.989849431327000e-02,+0.000000000000000e+00,+1.650000000000000e-02} 0 : (+3.773164627953717e-01 +0.000000000000000e+00*i) +1 : (-1.879164627953717e-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 = {-5.833762964529000e-02,+0.000000000000000e+00,+1.595000000000000e-02} 0 : (+3.757909455128675e-01 +0.000000000000000e+00*i) +1 : (-1.863909455128675e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.595000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.595000000000000e-02 Eigenvalues of linearized matrix around x = {-5.675739602929000e-02,+0.000000000000000e+00,+1.540000000000000e-02} 0 : (+3.742433442178057e-01 +0.000000000000000e+00*i) +1 : (-1.848433442178058e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.540000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.540000000000000e-02 Eigenvalues of linearized matrix around x = {-5.515712466987999e-02,+0.000000000000000e+00,+1.485000000000000e-02} 0 : (+3.726728311951576e-01 +0.000000000000000e+00*i) +1 : (-1.832728311951577e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.485000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.485000000000000e-02 Eigenvalues of linearized matrix around x = {-5.353610780296000e-02,+0.000000000000000e+00,+1.430000000000000e-02} 0 : (+3.710785278357110e-01 +0.000000000000000e+00*i) +1 : (-1.816785278357111e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.430000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.430000000000000e-02 Eigenvalues of linearized matrix around x = {-5.189359545066000e-02,+0.000000000000000e+00,+1.375000000000000e-02} 0 : (+3.694595002280993e-01 +0.000000000000000e+00*i) +1 : (-1.800595002280993e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.375000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.375000000000000e-02 Eigenvalues of linearized matrix around x = {-5.022879182086000e-02,+0.000000000000000e+00,+1.320000000000000e-02} 0 : (+3.678147542530114e-01 +0.000000000000000e+00*i) +1 : (-1.784147542530114e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.320000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.320000000000000e-02 Eigenvalues of linearized matrix around x = {-4.854085130245000e-02,+0.000000000000000e+00,+1.265000000000000e-02} 0 : (+3.661432301094945e-01 +0.000000000000000e+00*i) +1 : (-1.767432301094945e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.265000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.265000000000000e-02 Eigenvalues of linearized matrix around x = {-4.682887399945000e-02,+0.000000000000000e+00,+1.210000000000000e-02} 0 : (+3.644437961914413e-01 +0.000000000000000e+00*i) +1 : (-1.750437961914413e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.210000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.210000000000000e-02 Eigenvalues of linearized matrix around x = {-4.509190073757999e-02,+0.000000000000000e+00,+1.155000000000000e-02} 0 : (+3.627152422182646e-01 +0.000000000000000e+00*i) +1 : (-1.733152422182647e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.155000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.155000000000000e-02 Eigenvalues of linearized matrix around x = {-4.332890746481999e-02,+0.000000000000000e+00,+1.100000000000000e-02} 0 : (+3.609562715061762e-01 +0.000000000000000e+00*i) +1 : (-1.715562715061762e-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 = {-4.153879895394000e-02,+0.000000000000000e+00,+1.045000000000000e-02} 0 : (+3.591654922461770e-01 +0.000000000000000e+00*i) +1 : (-1.697654922461771e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.045000000000000e-02 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +1.045000000000000e-02 Eigenvalues of linearized matrix around x = {-3.972040169740999e-02,+0.000000000000000e+00,+9.900000000001000e-03} 0 : (+3.573414076290313e-01 +0.000000000000000e+00*i) +1 : (-1.679414076290314e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.900000000001000e-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 = +9.900000000001000e-03 Eigenvalues of linearized matrix around x = {-3.787245586458000e-02,+0.000000000000000e+00,+9.350000000001002e-03} 0 : (+3.554824046267829e-01 +0.000000000000000e+00*i) +1 : (-1.660824046267830e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +9.350000000001002e-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 = +9.350000000001002e-03 Eigenvalues of linearized matrix around x = {-3.599360616535000e-02,+0.000000000000000e+00,+8.800000000001001e-03} 0 : (+3.535867412020936e-01 +0.000000000000000e+00*i) +1 : (-1.641867412020936e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.800000000001001e-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 = +8.800000000001001e-03 Eigenvalues of linearized matrix around x = {-3.408239143296000e-02,+0.000000000000000e+00,+8.250000000001001e-03} 0 : (+3.516525316693621e-01 +0.000000000000000e+00*i) +1 : (-1.622525316693621e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +8.250000000001001e-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 = +8.250000000001001e-03 Eigenvalues of linearized matrix around x = {-3.213723269955000e-02,+0.000000000000000e+00,+7.700000000001000e-03} 0 : (+3.496777298728950e-01 +0.000000000000000e+00*i) +1 : (-1.602777298728951e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.700000000001000e-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 = +7.700000000001000e-03 Eigenvalues of linearized matrix around x = {-3.015641948915000e-02,+0.000000000000000e+00,+7.150000000001000e-03} 0 : (+3.476601097735280e-01 +0.000000000000000e+00*i) +1 : (-1.582601097735281e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.150000000001000e-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 = +7.150000000001000e-03 Eigenvalues of linearized matrix around x = {-2.813809399133000e-02,+0.000000000000000e+00,+6.600000000001000e-03} 0 : (+3.455972429420406e-01 +0.000000000000000e+00*i) +1 : (-1.561972429420407e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.600000000001000e-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 = +6.600000000001000e-03 Eigenvalues of linearized matrix around x = {-2.608023270090000e-02,+0.000000000000000e+00,+6.050000000001001e-03} 0 : (+3.434864723393775e-01 +0.000000000000000e+00*i) +1 : (-1.540864723393776e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +6.050000000001001e-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 = +6.050000000001001e-03 Eigenvalues of linearized matrix around x = {-2.398062500968000e-02,+0.000000000000000e+00,+5.500000000001001e-03} 0 : (+3.413248816120534e-01 +0.000000000000000e+00*i) +1 : (-1.519248816120534e-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 = {-2.183684810846000e-02,+0.000000000000000e+00,+4.950000000001000e-03} 0 : (+3.391092589351884e-01 +0.000000000000000e+00*i) +1 : (-1.497092589351884e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.950000000001000e-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 = +4.950000000001000e-03 Eigenvalues of linearized matrix around x = {-1.964623739091000e-02,+0.000000000000000e+00,+4.400000000001000e-03} 0 : (+3.368360541798945e-01 +0.000000000000000e+00*i) +1 : (-1.474360541798945e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +4.400000000001000e-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 = +4.400000000001000e-03 Eigenvalues of linearized matrix around x = {-1.740585133388000e-02,+0.000000000000000e+00,+3.850000000001000e-03} 0 : (+3.345013278458997e-01 +0.000000000000000e+00*i) +1 : (-1.451013278458997e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.850000000001000e-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 = +3.850000000001000e-03 Eigenvalues of linearized matrix around x = {-1.511242953958000e-02,+0.000000000000000e+00,+3.300000000001000e-03} 0 : (+3.321006897524766e-01 +0.000000000000000e+00*i) +1 : (-1.427006897524766e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +3.300000000001000e-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 = +3.300000000001000e-03 Eigenvalues of linearized matrix around x = {-1.276234223913000e-02,+0.000000000000000e+00,+2.750000000001000e-03} 0 : (+3.296292248794083e-01 +0.000000000000000e+00*i) +1 : (-1.402292248794084e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.750000000001000e-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 = +2.750000000001000e-03 Eigenvalues of linearized matrix around x = {-1.035152903338000e-02,+0.000000000000000e+00,+2.200000000001000e-03} 0 : (+3.270814029306557e-01 +0.000000000000000e+00*i) +1 : (-1.376814029306557e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +2.200000000001000e-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 = +2.200000000001000e-03 Eigenvalues of linearized matrix around x = {-7.875423928110999e-03,+0.000000000000000e+00,+1.650000000001000e-03} 0 : (+3.244509670637357e-01 +0.000000000000000e+00*i) +1 : (-1.350509670637357e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.650000000001000e-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 = +1.650000000001000e-03 Eigenvalues of linearized matrix around x = {-5.328862720015999e-03,+0.000000000000000e+00,+1.100000000001000e-03} 0 : (+3.217307956475089e-01 +0.000000000000000e+00*i) +1 : (-1.323307956475089e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +1.100000000001000e-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 = +1.100000000001000e-03 Eigenvalues of linearized matrix around x = {-2.705967374439000e-03,+0.000000000000000e+00,+5.500000000007001e-04} 0 : (+3.189127286649659e-01 +0.000000000000000e+00*i) +1 : (-1.295127286649659e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +5.500000000007001e-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 = +5.500000000007001e-04 Eigenvalues of linearized matrix around x = {-3.504141421475000e-15,+0.000000000000000e+00,+7.008282842946000e-16} 0 : (+3.159873471303809e-01 +0.000000000000000e+00*i) +1 : (-1.265873471303809e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : +7.008282842946000e-16 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Stable (+4.194638609690703e-01)-cone condition is satisfied around the equilibrium ! Slow Shadowing ... Slow Shadowing is satisfied !, w = +7.008282842946000e-16 Eigenvalues of linearized matrix around x = {+2.796823958608000e-03,+0.000000000000000e+00,-5.499999999993000e-04} 0 : (+3.129436891055992e-01 +0.000000000000000e+00*i) +1 : (-1.235436891055992e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -5.499999999993000e-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 = -5.499999999993000e-04 Eigenvalues of linearized matrix around x = {+5.693578154357001e-03,+0.000000000000000e+00,-1.099999999999000e-03} 0 : (+3.097688786998912e-01 +0.000000000000000e+00*i) +1 : (-1.203688786998912e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.099999999999000e-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 = -1.099999999999000e-03 Eigenvalues of linearized matrix around x = {+8.700945084008000e-03,+0.000000000000000e+00,-1.649999999999000e-03} 0 : (+3.064476333442457e-01 +0.000000000000000e+00*i) +1 : (-1.170476333442457e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -1.649999999999000e-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 = -1.649999999999000e-03 Eigenvalues of linearized matrix around x = {+1.183164559210000e-02,+0.000000000000000e+00,-2.199999999999000e-03} 0 : (+3.029615970798319e-01 +0.000000000000000e+00*i) +1 : (-1.135615970798319e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.199999999999000e-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 = -2.199999999999000e-03 Eigenvalues of linearized matrix around x = {+1.510102801068000e-02,+0.000000000000000e+00,-2.749999999999000e-03} 0 : (+2.992884189856826e-01 +0.000000000000000e+00*i) +1 : (-1.098884189856826e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -2.749999999999000e-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 = -2.749999999999000e-03 Eigenvalues of linearized matrix around x = {+1.852789603701000e-02,+0.000000000000000e+00,-3.299999999999000e-03} 0 : (+2.954004475858740e-01 +0.000000000000000e+00*i) +1 : (-1.060004475858740e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.299999999999000e-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 = -3.299999999999000e-03 Eigenvalues of linearized matrix around x = {+2.213570541397000e-02,+0.000000000000000e+00,-3.849999999999000e-03} 0 : (+2.912628272939695e-01 +0.000000000000000e+00*i) +1 : (-1.018628272939694e-01 +0.000000000000000e+00*i) +1 unstable positive eigenvalues ! slow variable 'w' : -3.849999999999000e-03 The Conley index CH_n(S) is not 0 for n = +1. 0 otherwise. Cone condition is satisfied ! Slow Shadowing ...