W. A. Kirk

Copyright © 2004 W. A. Kirk. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

We show that if U is a bounded open set in a complete CAT(0) space X, and if f:U¯→X is nonexpansive, then f always has a fixed point if there exists p∈U such that x∉[p,f(x)) for all x∈∂U. It is also shown that if K is a geodesically bounded closed convex subset of a complete ℝ-tree with int(K)≠∅, and if f:K→X is a continuous mapping for which x∉[p,f(x)) for some p∈int(K) and all x∈∂K, then f has a fixed point. It is also noted that a geodesically bounded complete ℝ-tree has the fixed point property for continuous mappings. These latter results are used to obtain variants of the classical fixed edge theorem in graph theory.