Rigidity of matrix group actions on CAT(0) spaces with possible parabolic isometries and uniquely arcwise connected spaces

Abstract

It is well-known that SLn(Qp) acts without fixed points on an (n-1)-dimensional CAT(0) space (the affine building). We prove that n-1 is the smallest dimension of CAT(0) spaces on which matrix groups act without fixed points. Explicitly, let R be an associative ring with identity and En (R) the extended elementary subgroup. Any isometric action of En (R) on a complete CAT(0) space Xd of dimension d<n-1 has a fixed point. Similar results are discussed for automorphism groups of free groups. Furthermore, we prove that any action of Aut(Fn),n≥ 3, on a uniquely arcwise connected space by homeomorphisms has a fixed point.