Proper CAT(0) actions of unipotent-free linear groups

Abstract

Let be a finitely generated group of matrices over C. We construct an isometric action of on a complete CAT(0) space X such that the restriction of this action to any subgroup of containing no nontrivial unipotent elements is well behaved. As an application, we show that if M is a graph manifold that does not admit a nonpositively curved Riemannian metric, then any finite-dimensional C-linear representation of π1(M) maps a nontrivial element of π1(M) to a unipotent matrix. In particular, the fundamental groups of such 3-manifolds do not admit any faithful finite-dimensional unitary representations.