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

TL;DR

This paper investigates the limit behavior of geometric quantizations on K"ahler manifolds with T-symmetry, showing convergence of quantum spaces associated with a family of polarizations to a mixed polarization in the presence of T-symmetry.

Contribution

It extends previous work by analyzing the quantum analog, demonstrating the convergence of quantum spaces and their T-equivariant isomorphisms as polarizations vary.

Findings

Existence of a T-equivariant isomorphism between initial and mixed quantum spaces.

Convergence of weight spaces of quantum spaces as the polarization parameter tends to infinity.

Quantum spaces associated with different polarizations become isomorphic in the limit.

Abstract

A compact K\"ahler manifold $\left( M,\omega ,J\right) $ with $T$-symmetry admits a natural mixed polarization $\mathcal{P}_{\mathrm{mix}}$ whose real directions come from the $T$-action. In \cite{LW1}, we constructed a one-parameter family of K\"ahler structures $\left( \omega ,J_{t}\right) $'s with the same underlying K\"a hler form $\omega $ and $J_{0}=J$, such that (i) there is a $T$-equivariant biholomorphism between $\left( M,J_{0}\right) $ and $\left( M,J_{t}\right) $ and (ii) K\"ahler polarizations $\mathcal{P} _{t}$'s corresponding to $J_{t}$'s converge to $\mathcal{P}_{\mathrm{mix}}$ 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 $\left( M,\omega \right) $. Let $\mathcal{H}_{t}$ and $ \mathcal{H}_{\mathrm{mix}}$ be quantum spaces defined using polarizations $\mathcal{P}_{t}$ and $\mathcal{P}_{\mathrm{mix}}$ respectively. In particular, $\mathcal{H}_{t}=H_{\bar{\partial}_{t}}^{0}\left( M,L\right) $. They are both representations of $T$. We show that (i) there is a $T$-equivariant isomorphism between $\mathcal{H}_{0}$ and $\mathcal{H}_{\mathrm{mix}}$ and (ii) for regular $T$-weight $\lambda $, corresponding $\lambda $-weight spaces $ \mathcal{H}_{t,\lambda }$'s converge to $\mathcal{H}_{\mathrm{mix},\lambda }$ as $t$ goes to infinity.