Iterative Approximation of Common Fixed Points of Two Nonself Asymptotically Nonexpansive Mappings

Suppose thatKis nonempty closed convex subset of a uniformly convex and smooth Banach spaceEwithPas a sunny nonexpansive retraction andF:=F(T1)∩F(T2)={x∈K:T1x=T2x=x}≠∅. LetT1,T2:K→Ebe two weakly inward nonself asymptotically nonexpansive mappings with respect toPwith two sequences{kn(i)}⊂[1,∞)satisfying∑n=1∞(kn(i)-1)<∞(i=1,2), respectively. For any givenx1∈K, suppose that{xn}is a sequence generated iteratively byxn+1=(1-αn)(PT1)nyn+αn(PT2)nyn,yn=(1-βn)xn+βn(PT1)nxn,n∈N, where{αn}and{βn}are sequences in[a,1-a]for somea∈(0,1). Under some suitable conditions, the strong and weak convergence theorems of{xn}to a common fixed point ofT1andT2are obtained.