On some properties of generalized quasiisometries with unbounded characteristic

Е. А. Севостьянов

On some properties of generalized quasiisometries with unbounded characteristic

Authors

E. A. Sevost'yanov

Abstract

We consider a family of the open discrete mappings

$f:\; D \rightarrow \overline{\mathbb{R}^n}$ that distort in a special way the

$p$ -modulus of families of curves connecting the components of spherical condenser in a domain

$D$ in

$\mathbb{R}^n$ ,

$p > n — 1,\;\; p < n$ , and omitting a set of positive

$p$ -capacity. We establish that this family is normal provided that some function realizing the control of the considered distortion of curve family has a finite mean oscillation at every point or only logarithmic singularities of the order, which is not larger than

$n − 1$ . We prove that, under these conditions, an isolated singularity

$x_0 \in D$ of the mapping

$f : D \ \{x_0\} \rightarrow \overline{\mathbb{R}^n}$ is removable and, moreover, the extended mapping is open and discrete. As applications we obtain analogs of the known Liouville and Sokhotski – Weierstrass theorems.

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Published

25.03.2011

Issue

Vol. 63 No. 3 (2011)

Section

Research articles

How to Cite

Sevost'yanov, E. A. “On Some Properties of Generalized Quasiisometries With Unbounded Characteristic”. Ukrains’kyi Matematychnyi Zhurnal, vol. 63, no. 3, Mar. 2011, pp. 385-98, https://umj.imath.kiev.ua/index.php/umj/article/view/2724.

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On some properties of generalized quasiisometries with unbounded characteristic

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