Geometric Property (T)

Abstract

This paper discusses `geometric property (T)'. This is a property of metric spaces introduced in earlier work of the authors for its applications to K-theory. Geometric property (T) is a strong form of `expansion property': in particular for a sequence of finite graphs (Xn), it is strictly stronger than (Xn) being an expander in the sense that the Cheeger constants h(Xn) are bounded below. We show here that geometric property (T) is a coarse invariant, i.e. depends only on the large-scale geometry of a metric space X. We also discuss the relationships between geometric property (T) and amenability, property (T), and various coarse geometric notions of a-T-menability. In particular, we show that property (T) for a residually finite group is characterised by geometric property (T) for its finite quotients.