Isometric group actions with vanishing rate of escape on CAT(0) spaces

Abstract

Let be a finitely generated group equipped with a symmetric and nondegenerate probability measure μ with finite second moment, and Y a CAT(0) space which is either proper or of finite telescopic dimension. We show that if an isometric action of on Y has vanishing rate of escape with respect to μ and does not fix a point in the boundary at infinity of Y, then there exists a flat subspace in Y which is left invariant under the action of . In the proof of this result, an equivariant μ-harmonic map from into Y plays an important role.