Naseer Shahzad¹ and Aniefiok Udomene²

Copyright © 2006 Naseer Shahzad and Aniefiok Udomene. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

Suppose K is a nonempty closed convex subset of a real Banach space E. Let S,T:K→K be two asymptotically quasi-nonexpansive maps with sequences {un},{vn}⊂[0,∞) such that ∑n=1∞un<∞ and ∑n=1∞vn<∞, and F=F(S)∩F(T):={x∈K:Sx=Tx=x}≠∅. Suppose {xn} is generated iteratively by x1∈K,xn+1=(1−αn)xn+αnSn[(1−βn)xn+βnTnxn],n≥1 where {αn} and {βn} are real sequences in [0,1]. It is proved that (a) {xn} converges strongly to some x∗∈F if and only if liminfn→∞d(xn,F)=0; (b) if X is uniformly convex and if either T or S is compact, then {xn} converges strongly to some x∗∈F. Furthermore, if X is uniformly convex, either T or S is compact and {xn} is generated by x1∈K,xn+1=αnxn+βnSn[α′nxn+β′nTnxn+γ′nz′n]+γnzn,n≥1, where {zn}, {z′n} are bounded, {αn},{βn},{γn},{α′n},{β′n},{γ′n} are real sequences in [0,1] such that αn+βn+γn=1=α′n+β′n+γ′n and {γn}, {γ′n} are summable; it is established that the sequence {xn} (with error member terms) converges strongly to some x∗∈F.