Complex symplectomorphisms and pseudo-K\"ahler islands in the quantization of toric manifolds

Abstract

Let P be a Delzant polytope. We show that the quantization of the corresponding toric manifold XP in toric K\"ahler polarizations and in the toric real polarization are related by analytic continuation of Hamiltonian flows evaluated at time t = -1 s. We relate the quantization of XP in two different toric K\"ahler polarizations by taking the time--1 s Hamiltonian "flow" of strongly convex functions on the moment polytope P. By taking s to infinity, we obtain the quantization of XP in the (singular) real toric polarization. Recall that XP has an open dense subset which is biholomorphic to (C*)n. The quantization of XP in a toric K\"ahler polarization can also be described by applying the complexified Hamiltonian flow of the Abreu--Guillemin symplectic potential g, at time t=-1, to an appropriate finite-dimensional subspace of quantum states in the quantization of T*Tn in the vertical polarization. By taking other imaginary times, t= k -1, k∈ R, we describe toric K\"ahler metrics with cone singularities along the toric divisors in XP. For convex Hamiltonian functions and sufficiently negative imaginary part of the complex time, we obtain degenerate K\"ahler structures which are negative definite in some regions of XP. We show that the pointwise and L2-norms of quantum states are asymptotically vanishing on negative-definite regions.