Quantization of Deformed Cluster Poisson Varieties

IF 0.5 4区数学 Q3 MATHEMATICS

Algebras and Representation Theory Pub Date : 2023-08-09 DOI:10.1007/s10468-023-10209-x

Man-Wai Mandy Cheung, Juan Bosco Frías-Medina, Timothy Magee

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引用次数: 0

Abstract

Fock and Goncharov described a quantization of cluster \(\mathcal {X}\)-varieties (also known as cluster Poisson varieties) in Fock and Goncharov (Ann. Sci. Éc. Norm. Supér. 42(6), 865–930 2009). Meanwhile, families of deformations of cluster \(\mathcal {X}\)-varieties were introduced in Bossinger et al. (Compos. Math. 156(10), 2149–2206, 2020). In this paper we show that the two constructions are compatible– we extend the Fock-Goncharov quantization of \(\mathcal {X}\)-varieties to the families of Bossinger et al. (Compos. Math. 156(10), 2149–2206, 2020). As a corollary, we obtain that these families and each of their fibers have Poisson structures. We relate this construction to the Berenstein-Zelevinsky quantization of \(\mathcal {A}\)-varieties (Berenstein and Zelevinsky, Adv. Math. 195(2), 405–455, 2005). Finally, inspired by the counter-example to quantum positivity of the quantum greedy basis in Lee, et al. (Proc. Natl. Acad. Sci. 111(27), 9712–9716, 2014), we compute a counter-example to quantum positivity of the quantum theta basis.

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变形簇Poisson变种的量化

福克和冈察洛夫在《福克和冈察洛夫（Ann. Sci Éc.Sci.Norm.Supér.42(6), 865-930 2009).同时，簇 \(\mathcal {X}\)-varieties 的变形族在博辛格等人（Compos.Math.156(10), 2149-2206, 2020).在本文中，我们证明了这两个构造是兼容的--我们把 \(\mathcal {X}\)-varieties 的福克-冈恰洛夫量子化扩展到了博辛格等人的族 (Compos. Math. 156(10, 2149-2206, 2020).Math.156(10), 2149-2206, 2020).作为推论，我们得到这些族及其每个纤维都具有泊松结构。我们将这一构造与 \(\mathcal {A}\)-varieties 的 Berenstein-Zelevinsky 量化联系起来（Berenstein 和 Zelevinsky，Adv. Math.195(2), 405-455, 2005).最后，受到李等人（Proc.Natl.111(27),9712-9716,2014）的启发，我们计算了量子 Theta 基的量子实在性反例。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Algebras and Representation Theory 数学-数学

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： Algebras and Representation Theory features carefully refereed papers relating, in its broadest sense, to the structure and representation theory of algebras, including Lie algebras and superalgebras, rings of differential operators, group rings and algebras, C*-algebras and Hopf algebras, with particular emphasis on quantum groups. The journal contains high level, significant and original research papers, as well as expository survey papers written by specialists who present the state-of-the-art of well-defined subjects or subdomains. Occasionally, special issues on specific subjects are published as well, the latter allowing specialists and non-specialists to quickly get acquainted with new developments and topics within the field of rings, algebras and their applications.