Geometric cycles in compact locally Hermitian symmetric spaces and automorphic representations

Abstract

Let G be a linear connected non-compact real simple Lie group and let K⊂ G be a maximal compact subgroup of G. Suppose that the centre of K isomorphic to S1 so that G/K is a global Hermitian symmetric space. Let θ be the Cartan involution of G that fixes K. Let be a uniform lattice in G such that θ()=. Suppose that G is one of the groups SU(p,q), p<q-1, q 5, SO0(2,q), Sp(n,R), n 4, SO*(2n), n 9. Then there exists a unique irreducible unitary representation Aq associated to a proper θ-stable parabolic subalgebra q with R+(q)=R-(q) such that if Hs,s(g,K;Aq',K) 0 for some 0<s R+(q), then Aq' is unitarily equivalent to either the trivial representation or to Aq. As a consequence, under suitable hypotheses on , we show that the multiplicity of Aq occurring in L2( G) is positive for any torsionless lattice ⊂ G commensurable with .