Bounds on multiplicities of symmetric pairs of finite groups

Abstract

Let be a finite group, let θ be an involution of , and let be an irreducible complex representation of . We bound ^θ in terms of the smallest dimension of a faithful Fp-representation of /Radp(), where p is any odd prime and Radp() is the maximal normal p-subgroup of . This implies, in particular, that if G is a group scheme over Z and θ is an involution of G, then the multiplicity of any irreducible representation in C∞ ( G(Zp)/ G θ(Zp) ) is bounded, uniformly in p.