Continuity of metric projections in uniformly convex and uniformly smooth Banach spaces

In 1979, Bjornestal obtained a local estimate for a modulus of uniform continuity of the metric projection operator on a closed subspace in a uniformly convex and uniformly smooth Banach space B. In the present paper we give the global version of this result for the projection operator on an arbitra

It is shown that if a separable real Banach space X admits a separating analytic Ž Ž . function with an additional condition property K , concerning uniform behaviour . of radii of convergence then every uniformly continuous mapping on X into any real Banach space Y can be approximated by analytic o

strong pseudocontraction with an open domain D T in E and a fixed point Ž . x\* g D T . We establish the strong convergence of the Mann and Ishikawa Ž . iterative processes with errors to the fixed point of T. Related results deal with the iterative solution of operator equations of the forms f g T

Let X be a uniformly smooth Banach space and T : X ª X a strongly accretive operator. In this paper, we give the error bounds for the approximation solutions of the nonlinear equation Tx s f generated by both the Mann and the Ishikawa iteration process. On the other hand, let K be a nonempty convex