Geometric quantizations of mixed polarizations on K\"ahler manifolds with T-symmetry

Abstract

Let M be a compact K\"ahler manifold equipped with a pre-quantum line bundle L. In [9], using T-symmetry, we constructed a polarization Pmix on M, which generalizes real polarizations on toric manifolds. In this paper, we obtain the following results for the quantum space Hmix associated to Pmix. First, Hmix consists of distributional sections of L with supports inside μ-1(t*Z). This gives Hmix=λ ∈ t*Z Hmix, λ. Second, the above decomposition of Hmix coincides with the weight decomposition for the T-symmetry. Third, an isomorphism Hmix, λ H0( M//λT, L//λT), for regular λ. Namely, geometric quantization commutes with symplectic reduction.