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JOURNALS // Matematicheskie Zametki // Archive

Mat. Zametki, 2009 Volume 86, Issue 2, Pages 175–183 (Mi mzm8474)

This article is cited in 8 papers

Quasi-Energy Function for Diffeomorphisms with Wild Separatrices

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

a N. I. Lobachevski State University of Nizhni Novgorod
b Université de Nantes

Abstract: We consider the class $G_4$ of Morse–Smale diffeomorphisms on $\mathbb S^3$ with nonwandering set consisting of four fixed points (namely, one saddle, two sinks, and one source). According to Pixton, this class contains a diffeomorphism that does not have an energy function, i.e., a Lyapunov function whose set of critical points coincides with the set of periodic points of the diffeomorphism itself. We define a quasi-energy function for any Morse–Smale diffeomorphism as a Lyapunov function with the least number of critical points. Next, we single out the class $G_{4,1}\subset G_4$ of diffeomorphisms inducing a special Heegaard splitting of genus 1 of the sphere $\mathbb S^3$. For each diffeomorphism in $G_{4,1}$, we present a quasi-energy function with six critical points.

Keywords: Morse–Smale diffeomorphism, Lyapunov function, Morse theory, saddle, sink, source, separatrix, wild embedding, Heegaard splitting, cobordism.

UDC: 514.74

Received: 13.11.2008

DOI: 10.4213/mzm8474


 English version:
Mathematical Notes, 2009, 86:2, 163–170

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