On L-ω-nonexpansive maps

Abstract

We consider L-ω-nonexpansive maps T K K on a convex subset K of a Banach space X, i.e., maps in which ωT(δ)≤ Lδ +ω(δ) with L∈ [0,1], ω being a modulus of continuity and ωT is the minimal modulus of continuity of T. Both AFPP and FPP are studied. For moduli ω with ω'(0)=∞, we show that if X contains an isomorphic copy of then it fails the FPP for 0-ω-nonexpansive maps with minimal displacement zero. In the affirmative direction, we prove for certain class of moduli ω that 0-ω-nonexpansive maps are constant on certain domains. Also, when ω'(0)≤ 1-L we show that AFPP works and FPP also works under a monotonicity condition on ω. Further related results and examples are given.