|
Mathematical problems of nonlinearity
Cantor Type Basic Sets of Surface $A$-endomorphisms
V. Z. Grines, E. V. Zhuzhoma National Research University Higher School of Economics,
ul. B. Pecherskaya 25/12, Nizhny Novgorod, 603150 Russia
Аннотация:
The paper is devoted to an investigation of the genus of an orientable closed surface $M^2$
which admits $A$-endomorphisms whose nonwandering set contains a one-dimensional strictly
invariant contracting repeller $\Lambda_r^{}$ with a uniquely defined unstable bundle and with
an admissible boundary of finite type. First, we prove that, if $M^2$ is a torus or a
sphere, then $M^2$ admits such an endomorphism. We also show that, if $ \Omega$ is a basic set with a uniquely defined unstable bundle of the endomorphism $f\colon M^2\to M^2$ of a closed orientable surface $M^2$ and $f$ is not a diffeomorphism, then $ \Omega$ cannot be a Cantor type expanding attractor. At last, we prove that, if $f\colon M^2\to M^2$ is an $A$-endomorphism whose nonwandering set consists of a finite number of isolated periodic sink orbits and a one-dimensional strictly invariant contracting repeller of Cantor type $\Omega_r^{}$ with a uniquely defined unstable bundle and such that the lamination consisting of stable manifolds of $\Omega_r^{}$ is regular, then $M^2$ is a two-dimensional torus $\mathbb{T}^2$ or a two-dimensional sphere $\mathbb{S}^2$.
Ключевые слова:
$A$-endomorphism, regular lamination, attractor, repeller, strictly invariant set.
Поступила в редакцию: 30.07.2021 Принята в печать: 25.08.2021
Образец цитирования:
V. Z. Grines, E. V. Zhuzhoma, “Cantor Type Basic Sets of Surface $A$-endomorphisms”, Rus. J. Nonlin. Dyn., 17:3 (2021), 335–345
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/nd760 https://www.mathnet.ru/rus/nd/v17/i3/p335
|
|