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Taurida Journal of Computer Science Theory and Mathematics, 2021, Issue 1, Pages 101–114 (Mi tvim112)  

This article is cited in 1 scientific paper (total in 1 paper)

On bifurcations that change the type of heteroclinic curves of a Morse-Smale $3$-diffeomorphism

V. I. Shmukler, O. V. Pochinkaa

a National Research University – Higher School of Economics in Nizhny Novgorod
Abstract: In this paper, we consider the class $G$ of orientation-preserving Morse-Smale diffeomorphisms defined on a closed $3$-manifold whose non-wandering set consists of exactly four points of pairwise distinct Morse indices. It is known that the two-dimensional saddle separatrices of any such diffeomorphism always intersect and their intersection necessarily contains non-compact heteroclinic curves, but may also contain compact ones. The main result of this work is the construction of a path in the space of diffeomorphisms connecting the diffeomorphism $ f \in G $ with the diffeomorphism $f' \in G$, which does not have compact heteroclinic curves. This result is an important step in solving the open problem of describing the topology of $3$-manifolds admitting gradient-like diffeomorphisms with wildly embedded saddle separatrices. Consider the class $G$ of orientation-preserving Morse-Smale diffeomorphisms $f$ defined on the closed manifold $ M^3$, the non-wandering set of which consists of exactly four points $ \omega, \sigma_{1}, \sigma_{2}, \alpha $ with positive types of orientation and with Morse indices (dimensions of unstable manifolds) $ 0,1,2,3 $, respectively. Despite the simple structure of the non-wandering set, the class under consideration contains diffeomorphisms with wildly embedded saddle separatrices [2] (see Fig. 1). It was proved in [3] that for any diffeomorphism $ f \in G $ the set $ H_f = W^{s}_{\sigma_{1}} \cap {W^{u} _ { \sigma_{2}}} $ is not empty and contains at least one non-compact heteroclinic curve. According to [3], in the case of a manual embedding of the closures of one-dimensional separatrices of the diffeomorphism $f \in G$, the bearing manifold $ M^3 $ admits a Heegaard decomposition of genus $1$ and, therefore, is a lens space (see, for example, [7]). In the case of a wild embedding, the description of the topology of the supporting manifold is an open problem formulated in [3]. In the present paper, an important step has been taken in solving this problem; namely, the following fact is proved.
Theorem. Let the manifold $ M^3 $ admit a diffeomorphism $ {f} \in {G} $. Then the same manifold admits a diffeomorphism $ {f}'\in {G} $, a wandering set that does not contain compact heteroclinic curves.
Keywords: Morse-Smale diffeomorphism, heteroclinic curve, unstable manifold, stable manifold, orientation-preserving diffeomorphism manifold, topological flow, regular dynamics, hyperbolic set, chain recurrent set.
Funding agency Grant number
Russian Science Foundation 21-11-00010
Document Type: Article
UDC: 517.9
MSC: 37C05
Language: Russian
Citation: V. I. Shmukler, O. V. Pochinka, “On bifurcations that change the type of heteroclinic curves of a Morse-Smale $3$-diffeomorphism”, Taurida Journal of Computer Science Theory and Mathematics, 2021, no. 1, 101–114
Citation in format AMSBIB
\Bibitem{ShmPoc21}
\by V.~I.~Shmukler, O.~V.~Pochinka
\paper On bifurcations that change the type of heteroclinic curves of a Morse-Smale $3$-diffeomorphism
\jour Taurida Journal of Computer Science Theory and Mathematics
\yr 2021
\issue 1
\pages 101--114
\mathnet{http://mi.mathnet.ru/tvim112}
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  • This publication is cited in the following 1 articles:
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    Taurida Journal of Computer Science Theory and Mathematics
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