复曲面奇异实极化中的Berezin–Toeplitz量子化

IF 1.2 3区数学 Q1 MATHEMATICS

Communications in Number Theory and Physics Pub Date : 2021-05-06 DOI:10.4310/cntp.2022.v16.n4.a6

N. Leung, Y. Yau

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引用次数: 1

摘要

在紧致Kähler流形$X$上，Toeplitz算子确定了一个变形量化$(\operatorname{C}^\infty(X, \mathbb{C})[[\hbar]], \star)$，其中变量[10]相对于横向复极化$T^{1, 0}X, T^{0, 1}X$的分离为$\hbar \to 0^+$[15]。对于具有横向非奇异实极化[13]的紧辛流形证明了类似的命题。本文建立了紧环辛流形$X$上的横向奇异实极化的类似结果。由于环奇点的存在，我们的Toeplitz算子的半形式校正和局部化是必不可少的。通过范数估计，我们证明这些Toeplitz算子确定$X$上的明星产品为$\hbar \to 0^+$。

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Berezin–Toeplitz quantization in real polarizations with toric singularities

On a compact K\"ahler manifold $X$, Toeplitz operators determine a deformation quantization $(\operatorname{C}^\infty(X, \mathbb{C})[[\hbar]], \star)$ with separation of variables [10] with respect to transversal complex polarizations $T^{1, 0}X, T^{0, 1}X$ as $\hbar \to 0^+$ [15]. The analogous statement is proved for compact symplectic manifolds with transversal non-singular real polarizations [13]. In this paper, we establish the analogous result for transversal singular real polarizations on compact toric symplectic manifolds $X$. Due to toric singularities, half-form correction and localization of our Toeplitz operators are essential. Via norm estimations, we show that these Toeplitz operators determine a star product on $X$ as $\hbar \to 0^+$.

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来源期刊

Communications in Number Theory and Physics MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

2.70

自引率

5.30%

发文量

审稿时长

>12 weeks

期刊介绍： Focused on the applications of number theory in the broadest sense to theoretical physics. Offers a forum for communication among researchers in number theory and theoretical physics by publishing primarily research, review, and expository articles regarding the relationship and dynamics between the two fields.