Limit of geometric quantizations on K\"ahler manifolds with T-symmetry

Abstract

A compact K\"ahler manifold ( M,ω ,J) with T-symmetry admits a natural mixed polarization Pmix whose real directions come from the T-action. In LW1, we constructed a one-parameter family of K\"ahler structures ( ω ,Jt) 's with the same underlying K\"a hler form ω and J0=J, such that (i) there is a T-equivariant biholomorphism between ( M,J0) and ( M,Jt) and (ii) K\"ahler polarizations P t's corresponding to Jt's converge to Pmix as t goes to infinity. In this paper, we study the quantum analog of above results. Assume L is a pre-quantum line bundle on ( M,ω ) . Let Ht and Hmix be quantum spaces defined using polarizations Pt and Pmix respectively. In particular, Ht=H∂t0( M,L) . They are both representations of T. We show that (i) there is a T-equivariant isomorphism between H0 and Hmix and (ii) for regular T-weight λ , corresponding λ -weight spaces Ht,λ 's converge to Hmix,λ as t goes to infinity.