@article{24, author = {N. Duignan and J. Meiss}, title = {Nonexistence of Invariant Tori Transverse to Foliations: An Application of Converse KAM Theory*}, abstract = {
Invariant manifolds are of fundamental importance to the qualitative understanding of dynamical systems. In this work, we explore and extend MacKay{\textquoteright}s converse Kolmogorov{\textendash}Arnol{\textquoteright}d{\textendash}Moser condition to obtain a sufficient condition for the nonexistence of invariant surfaces that are transverse to a chosen 1D foliation. We show how useful foliations can be constructed from approximate integrals of the system. This theory is implemented numerically for two models: a particle in a two-wave potential and a Beltrami flow studied by Zaslavsky (Q-flows). These are both 3D volume-preserving flows, and they exemplify the dynamics seen in time-dependent Hamiltonian systems and incompressible fluids, respectively. Through both numerical and theoretical considerations, it is revealed how to choose foliations that capture the nonexistence of invariant tori with varying homologies.
The authors acknowledge support from the Simons Foundation Grant (No. $\#$601972) {\textquotedblleft}Hidden Symmetries and Fusion Energy.{\textquotedblright} Useful conversations with Robert MacKay and Josh Burby are gratefully acknowledged.
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