Degeneration of Kahler polarizations to mixed polarizations on toric varieties

Abstract

Let (X, ω, J) be a toric variety of dimension 2n determined by a Delzant polytope. In this paper, we first construct the polarizations k by the Hamiltonian Tk-action on X (see Theorem 3.11). We will show that k is a singular mixed polarization for 1 k < n, and n is a singular real polarization which coincides with the real polarization studied in BFMN on the open dense subset of X. Then for each 1 k n, we will find a one-parameter family of K\"ahler polarizations k,t on X that converges to k (see Theorem 3.12). Finally, we will show that k,tT the space of Tk-invariant Jk,t-holomorphic sections converges to k0 (see Theorem 3.18).