Relative Property (T) for Nilpotent Subgroups

Abstract

We show that relative Property (T) for the abelianization of a nilpotent normal subgroup implies relative Property (T) for the subgroup itself. This and other results are a consequence of a theorem of independent interest, which states that if H is a closed subgroup of a locally compact group G, and A is a closed subgroup of the center of H, such that A is normal in G, and (G/A, H/A) has relative Property (T), then (G, H(1)) has relative Property (T), where H(1) is the closure of the commutator subgroup of H. In fact, the assumption that A is in the center of H can be replaced with the weaker assumption that A is abelian and every H-invariant finite measure on the unitary dual of A is supported on the set of fixed points.