C. E. Chidume¹ and Bashir Ali²

Copyright © 2007 C. E. Chidume and Bashir Ali. 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

Let E be a real Banach space, K a closed convex nonempty subset of E, and T1,T2,…,Tm:K→K asymptotically quasi-nonexpansive mappings with sequences (resp.) {kin}n=1∞ satisfying kin→1 as n→∞, and ∑n=1∞(kin−1)<∞, i=1,2,…,m. Let {αn}n=1∞ be a sequence in [ε, 1−ε],  ε∈(0,1). Define a sequence {xn} by x1∈K, xn+1=(1−αn)xn+αnT1nyn+m−2, yn+m−2=(1−αn)xn+αnT2nyn+m-3, …, yn=(1−αn)xn+αnTmnxn, n≥1,  m≥2. Let ⋂i=1mF(Ti)≠∅. Necessary and sufficient conditions for a strong convergence of the sequence {xn} to a common fixed point of the family {Ti}i=1m are proved. Under some appropriate conditions, strong and weak convergence theorems are also proved.