Non-vanishing cohomology classes in uniform lattices of SO(n,H) and automorphic representations

Abstract

Let X denote the non-compact globally Hermitian symmetric space of type DIII, namely, SO(n,H)/U(n). Let be a uniform torsionless lattice in SO(n,H). In this note we construct certain complex analytic submanifolds in the locally symmetric space X:= SO(n,H)/U(n) for certain finite index sub lattices ⊂ and show that their dual cohomology classes in H*(X;C) are not in the image of the Matsushima homomorphism H*(Xu; C) H*(X;C), where Xu=SO(2n)/U(n) is the compact dual of X. These submanifold arise as sub-locally symmetric spaces which are totally geodesic, and, when satisfies certain additional conditions, they are non-vanishing `special cycles'. Using the fact that X is a K\"ahler manifold, we deduce the occurrence in L2( SO(n,H) of a certain irreducible representation (Aq, Aq) with non-zero multiplicity when n 9. The representation Aq is associated to a certain θ-stable parabolic subalgebra q of g0:=so(n,H). Denoting the smooth U(n)-finite vectors of Aq by Aq,U(n), the representation Aq is characterised by the property that Hp,p(g0,U(n); Aq,U(n)) Hp-n+2,p-n+2(SO(2n-2)/U(n-1);C),~p 0, for n 9.