Non-stable groups

Abstract

In this article we discuss cohomological obstructions to two kinds of group stability. In the first part, we show that residually finite groups which arise as fundamental groups of compact Riemannian manifolds with strictly negative sectional curvature are not uniform-to-local stable with respect to the operator norm if their even Betti numbers b2i() do not vanish. In the second part, we show that non-vanishing of Betti numbers bi() in dimension i>1 obstructs C*-algebra stability for groups approximable by unitary matrices that admit a coarse embedding in a Hilbert space.