On fixed points of contraction maps acting in (q 1 ; q 2 )-quasimetric spaces and geometric properties of these spaces

We study geometric properties of (q 1 ; q 2 )-quasimetric spaces and fixed point theorems in these spaces. In paper [1], a fixed point theorem was obtained for a contraction map acting in a complete (q 1 ; q 2 )-quasimetric space. The graph of the map was assumed to be closed. In this paper, we show that this assumption is essential, i.e. we provide an example of a complete quasimetric space and a contraction map acting in it whose graph is not closed and which is fixed-point-free We also describe some geometric properties of such spaces. © 2017, Eurasian Mathematical Journal.

Authors
Publisher
Eurasian Mathematical Journal
Number of issue
3
Language
English
Pages
70-76
Status
Published
Volume
8
Year
2017
Organizations
  • 1 S.M. Nikol'skii Mathematical Institute, Department of Nonlinear Analysis and Optimization, Peoples' Friendship University of Russia (RUDN University), 6 Mikhluko-Maklaya St, Moscow, 117198, Russian Federation
Keywords
Fixed point; Quasimetric space
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