О классах Орлича – Соболева и отображениях с ограниченным интегралом Дирихле

В. І. Рязанов; Р. Р. Салімов; Є. О. Севостьянов

On the Orlicz–Sobolev Classes and Mappings with Bounded Dirichlet Integral

Authors

V. I. Ryazanov Ин-т прикл. математики и механики НАН Украины, Донецк
R. R. Salimov Ин-т прикл. математики и механики НАН Украины, Донецк
E. A. Sevost'yanov

Abstract

It is shown that homeomorphisms f in

${{\mathbb{R}}^n}$ , n ≥ 2, with finite Iwaniec distortion of the Orlicz–Sobolev classes W ^1,φ _loc under the Calderon condition on the function φ and, in particular, the Sobolev classes W ^1,φ _loc, p > n - 1, are differentiable almost everywhere and have the Luzin (N) -property on almost all hyperplanes. This enables us to prove that the corresponding inverse homeomorphisms belong to the class of mappings with bounded Dirichlet integral and establish the equicontinuity and normality of the families of inverse mappings.

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Published

25.09.2013

Issue

Vol. 65 No. 9 (2013)

Section

Research articles

How to Cite

Ryazanov, V. I., et al. “On the Orlicz–Sobolev Classes and Mappings With Bounded Dirichlet Integral”. Ukrains’kyi Matematychnyi Zhurnal, vol. 65, no. 9, Sept. 2013, pp. 1254–1265, https://umj.imath.kiev.ua/index.php/umj/article/view/2506.

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