Strong relative property (T) and spectral gap of random walks

Abstract

We consider strong relative property (T) for pairs (, G) where acts on G. If N is a connected Lie group and is a group of automorphisms of N, we choose a finite index subgroup 0 of and obtain that (, [ 0, N]) has strong relative property (T) provided Zariski-closure of has no compact factor of positive dimension. We apply this to obtain the following: G is a connected Lie group with solvable radical R and a semisimple Levi subgroup S. If Snc denotes the product of noncompact simple factors of S and ST denotes the product of simple factors in Snc that have property (T), then we show that (, R) has strong relative property (T) for a Zariski-dense closed subgroup of Snc if and only if R=[Snc,R]. The case when N is a vector group is discussed separately and some interesting results are proved. We also considered actions on solenoids K and proved that if acts on a solenoid K, then (, K) has strong relative property (T) under certain conditions on . For actions on solenoids we provided some alternatives in terms of amenability and strong relative property (T). We also provide some applications to the spectral gap of π (μ)=∫ π (g) dμ (g) where π is a certain unitary representation and μ is a probability measure.