On the Asymptotic Behavior of Ring $Q$-homeomorphisms with Respect to   $P$-modulus

Ruslan Salimov; Bogdan Klishchuk

arXiv:2005.13460·math.CV·June 3, 2020

On the Asymptotic Behavior of Ring $Q$-homeomorphisms with Respect to $P$-modulus

Ruslan Salimov, Bogdan Klishchuk

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TL;DR

This paper investigates the asymptotic behavior at infinity of ring $Q$-homeomorphisms concerning the $p$-modulus for $p>n$, providing insights into their boundary behavior and growth properties.

Contribution

It offers new results on the asymptotic properties of ring $Q$-homeomorphisms with respect to $p$-modulus for $p>n$, extending understanding of their boundary behavior.

Findings

01

Characterization of asymptotic behavior at infinity

02

Conditions for boundary behavior of ring $Q$-homeomorphisms

03

Extension of known results to $p>n$ case

Abstract

We study the behavior at infinity of ring $Q$ -homeomorphisms with respect to $p$ -modulus for $p > n$ .

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Taxonomy

TopicsAnalytic and geometric function theory · Holomorphic and Operator Theory · Meromorphic and Entire Functions