RUS  ENG
Full version
JOURNALS // Contemporary Mathematics. Fundamental Directions // Archive

CMFD, 2020 Volume 66, Issue 2, Pages 160–181 (Mi cmfd399)

This article is cited in 1 paper

On embedding of the Morse–Smale diffeomorphisms in a topological flow

V. Z. Grines, E. Ya. Gurevich, O. V. Pochinka

National Research University “Higher School of Economics,” Nizhniy Novgorod, Russia

Abstract: This review presents the results of recent years on solving of the Palis problem on finding necessary and sufficient conditions for the embedding of Morse–Smale cascades in topological flows. To date, the problem has been solved by Palis for Morse–Smale diffeomorphisms given on manifolds of dimension two. The result for the circle is a trivial exercise. In dimensions three and higher new effects arise related to the possibility of wild embeddings of closures of invariant manifolds of saddle periodic points that leads to additional obstacles for Morse–Smale diffeomorphisms to embed in topological flows. The progress achieved in solving of Palis's problem in dimension three is associated with the recently obtained complete topological classification of Morse–Smale diffeomorphisms on three-dimensional manifolds and the introduction of new invariants describing the embedding of separatrices of saddle periodic points in a supporting manifold. The transition to a higher dimension requires the latest results from the topology of manifolds. The necessary topological information, which plays key roles in the proofs, is also presented in the survey.

UDC: 517.938

DOI: 10.22363/2413-3639-2020-66-2-160-181



© Steklov Math. Inst. of RAS, 2024