Journal of Applied Mathematics (Jan 2012)
Strong Convergence of Viscosity Approximation Methods for Nonexpansive Mappings in CAT(0) Spaces
Abstract
Viscosity approximation methods for nonexpansive mappings in CAT(0) spaces are studied. Consider a nonexpansive self-mapping T of a closed convex subset C of a CAT(0) space X. Suppose that the set Fix(T) of fixed points of T is nonempty. For a contraction f on C and t∈(0,1), let xt∈C be the unique fixed point of the contraction x↦tf(x)⊕(1-t)Tx. We will show that if X is a CAT(0) space satisfying some property, then {xt} converge strongly to a fixed point of T which solves some variational inequality. Consider also the iteration process {xn}, where x0∈C is arbitrary and xn+1=αnf(xn)⊕(1-αn)Txn for n≥1, where {αn}⊂(0,1). It is shown that under certain appropriate conditions on αn,{xn} converge strongly to a fixed point of T which solves some variational inequality.
