Quantum spaces associated to mixed polarizations and their limiting behavior on toric varieties

Abstract

Let (X, ω, J) be a toric variety of dimension 2n determined by a Delzant polytope P. As indicated in [40], X admits a natural mixed polarization Pk, induced by the action of a subtorus Tk. In this paper, we first establish the quantum space Hk for Pk, identifying a basis parameterized by the integer lattice points of P. This confirms that the dimension of Hk aligns with those derived from K\"ahler and real polarizations. Secondly, we examine a one-parameter family of K\"ahler polarizations Pk,t, defined via symplectic potentials, and demonstrate their convergence to Pk. Thirdly, we verify that these polarizations Pk,t coincide with those induced by imaginary-time flow. Finally, we explore the relationship between the quantum space Hk,0 and Hk, establishing that ``t → ∞ Hk,t = Hk."

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