Theta series and generalized special cycles on Hermitian locally symmetric manifolds

Abstract

We study generalized special cycles on Hermitian locally symmetric spaces D associated to the groups G=U(p,q), Sp(2n,R) and O*(2n). These cycles are (covered by) locally symmetric spaces associated to subgroups of G which are of the same type. Using oscillator representation and a construction which essentially comes from the thesis of Greg Anderson, we show that Poincar\'e duals of these generalized special cycles can be viewed as Fourier coefficients of a theta series. This gives new cases of theta lifts from the cohomology of Hermtian locally symmetric manifolds associated to G to vector valued automorphic forms associated to the groups G'=U(m,m), O(m,m) or Sp(m,m) which forms a reductive dual pair with G in the sense of Howe.