Lyudmila S. Efremova, “$C^1$-Smooth $\Omega$-Stable Skew Products and Completely Geometrically Integrable Self-Maps of 3D-Tori, I: $\Omega$-Stability”, Regul. Chaotic Dyn., 2024, Volume 29, Issue 3,Pages 491

This article is cited in 2 papers

$C^1$-Smooth $\Omega$-Stable Skew Products and Completely Geometrically Integrable Self-Maps of 3D-Tori, I: $\Omega$-Stability

Lyudmila S. Efremova^ab

^a Moscow Institute of Physics and Technology, Institutsky per. 9, 141701 Dolgoprudny, Russia
^b Nizhny Novgorod State University, pr. Gagarina 23, 603022 Nizhny Novgorod, Russia

Abstract: We prove here the criterion of $C^1$- $\Omega$-stability of self-maps of a 3D-torus, which are skew products of circle maps. The $C^1$- $\Omega$-stability property is studied with respect to homeomorphisms of skew products type. We give here an example of the $\Omega$-stable map on a 3D-torus and investigate approximating properties of maps under consideration.

Keywords: skew product of circle maps, quotient map, fiber maps, $C^1$-stability of a family of fiber maps as a whole, $C^1$- $\Omega$-stable skew product

MSC: 37C05, 37C20, 37D30, 37Exx

Received: 24.12.2023
Accepted: 28.03.2024

Language: English

DOI: 10.1134/S1560354724520010