RUS  ENG
Full version
JOURNALS // Russian Journal of Nonlinear Dynamics // Archive

Rus. J. Nonlin. Dyn., 2020 Volume 16, Number 4, Pages 595–606 (Mi nd731)

Mathematical problems of nonlinearity

The Topological Classification of Diffeomorphisms of the Two-Dimensional Torus with an Orientable Attractor

V. Z. Grinesa, E. V. Kruglovb, O. V. Pochinkaa

a National Research University Higher School of Economics, ul. B. Pecherskaya 25/12, Nizhny Novgorod, 603150 Russia
b Lobachevsky State University of Nizhny Novgorod, prosp. Gagarina 23, Nizhny Novgorod, 603950 Russia

Abstract: This paper is devoted to the topological classification of structurally stable diffeomorphisms of the two-dimensional torus whose nonwandering set consists of an orientable one-dimensional attractor and finitely many isolated source and saddle periodic points, under the assumption that the closure of the union of the stable manifolds of isolated periodic points consists of simple pairwise nonintersecting arcs. The classification of one-dimensional basis sets on surfaces has been exhaustively obtained in papers by V. Grines. He also obtained a classification of some classes of structurally stable diffeomorphisms of surfaces using combined algebra-geometric invariants. In this paper, we distinguish a class of diffeomorphisms that admit purely algebraic differentiating invariants.

Keywords: A-diffeomorphisms of a torus, topological classification, orientable attractor.

MSC: 37D20

Received: 30.11.2020
Accepted: 14.12.2020

DOI: 10.20537/nd200405



Bibliographic databases:


© Steklov Math. Inst. of RAS, 2024