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Paper IPM / M / 16894

School of Mathematics
Title:	$(\Alpha, \Beta)$ -nonexpansive mappings and Picard operators
Author(s):	Hamid Reza Hajisharifi (Joint with A. Amini-Harandi and M. Goli)
Status:	Published
Journal:	Fixed Point Theory
Vol.:	25
Year:	2024
Pages:	163-170
Supported by:	IPM

Abstract:

Let C be a nonempty closed bounded (not necessary convex) subset of a Banach space X and let T : C \to C be an (\alpha,\beta)-nonexpansive mapping with \alpha > 0, \beta > 0 and \alpha +\beta < 1. In this paper, we show that T has a unique fixed point. Moreover, T is a Picard operator if and only if T is asymptotically regular.

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“School of Mathematics”

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