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JOURNALS // Trudy Matematicheskogo Instituta imeni V.A. Steklova // Archive

Trudy Mat. Inst. Steklova, 2012 Volume 278, Pages 34–48 (Mi tm3404)

This article is cited in 15 papers

Dynamically ordered energy function for Morse–Smale diffeomorphisms on $3$-manifolds

V. Z. Grinesa, F. Laudenbachb, O. V. Pochinkaa

a Lobachevsky State University of Nizhni Novgorod, Nizhni Novgorod, Russia
b Laboratoire de Mathématiques Jean Leray, UMR 6629 du CNRS, Faculté des Sciences et Techniques, Université de Nantes, Nantes, France

Abstract: This paper deals with arbitrary Morse–Smale diffeomorphisms in dimension $3$ and extends ideas from the authors' previous studies where the gradient-like case was considered. We introduce a kind of Morse–Lyapunov function, called dynamically ordered, which fits well the dynamics of a diffeomorphism. The paper is devoted to finding conditions for the existence of such an energy function, that is, a function whose set of critical points coincides with the nonwandering set of the considered diffeomorphism. We show that necessary and sufficient conditions for the existence of a dynamically ordered energy function reduce to the type of the embedding of one-dimensional attractors and repellers, each of which is a union of zero- and one-dimensional unstable (stable) manifolds of periodic orbits of a given Morse–Smale diffeomorphism on a closed $3$-manifold.

UDC: 517.938

Received in March 2011


 English version:
Proceedings of the Steklov Institute of Mathematics, 2012, 278, 27–40

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