Asymptotically orientation-preserving mappings in Banach spaces

Let C be a closed, convex subset of a uniformly convex Banach space whose norm is uniformly Ga^teaux differentiable and let T be an asymptotically nonexpansive mapping from C into itself such that the set F(T ) of fixed points of T is nonempty. In this paper, we show that F(T ) is a sunny, nonexpans

In this paper, we prove that if ρ is a convex, σ-finite modular function satisfying a 2 -type condition, C a convex, ρ-bounded, ρ-a.e. compact subset of L ρ , and T C → C a ρ-asymptotically nonexpansive mapping, then T has a fixed point. In particular, any asymptotically nonexpansive self-map define

In this paper we study spaces of mappings A : K ª K satisfying Ax s x for all x g F, where K is a closed convex subset of a hyperbolic complete metric space and F is a closed convex subset of K. These spaces are equipped with natural Ž . complete uniform structures. We study the convergence of power