Approximating common fixed points of asymptotically nonexpansive maps in uniformly convex Banach spaces

In a uniformly convex Banach space, the convergence of Ishikawa iterates to a unique fixed point is proved for quasi-nonexpansive mappings under certain conditions.

In this paper, a strong convergence theorem for asymptotically nonexpansive mappings in a uniformly convex and smooth Banach space is proved by using metric projections. This theorem extends and improves the recent strong convergence theorem due to Matsushita and Takahashi [S. Matsushita, W. Takahas

Let E be a real reflexive Banach space which admits a weakly sequentially continuous duality mapping from E to E \* , and K be a nonempty closed convex subset of E. Suppose that {T n } (n = 1, 2, . . .) is a uniformly asymptotically regular sequence of nonexpansive mappings from K into itself such t

Suppose K is a nonempty closed convex nonexpansive retract of a real uniformly convex Banach space E with P as a nonexpansive retraction. Let T : K → E be a nonexpansive non-self map with n 1, where { n } and { n } are real sequences in [ , 1 -] for some ∈ (0, 1). ( 1) If the dual E \* of E has the

Let C be a closed convex subset of a real uniformly smooth and strictly convex Banach space E. Consider the following iterative algorithm given by where f is a contraction on C and W n is a mapping generated by an infinite family of nonexpansive mappings {T i } ∞ i=1 . Assume that the set of common