Fixed point results for a new mapping related to mean nonexpansive mappings

Abstract

Mean nonexpansive mappings were first introduced in 2007 by Goebel and Japon Pineda and advances have been made by several authors toward understanding their fixed point properties in various contexts. For any given (α1, α2)-nonexpansive mapping T of a Banach space, many of the positive results have been derived from properties of the mapping Tα = α1 T + α2T2= (α1I + α2T) T which is nonexpansive. However, the related mapping T (α1I + α2T) has not yet been studied. In this paper, we investigate some fixed point properties of this new mapping and discuss relationships between (α1I + α2T) T and T(α1I + α2T).