总正性是一种量子现象:格拉斯曼案例

IF 2 4区数学 Q1 MATHEMATICS Memoirs of the American Mathematical Society Pub Date : 2023-11-01 DOI:10.1090/memo/1448

Stéphane Launois, Tom Lenagan, Brendan Nolan

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引用次数: 5

摘要

本文的主要目的是建立完全非负格拉斯曼与量子格拉斯曼之间的深层联系。更准确地说，在形变参数q q是超越的假设下，我们证明了“量子正子类”在量子格拉斯曼态O q(G mn (F)) {\mathcal O}_q(G_{mn}(\mathbb {F}))中是完全素数理想。由此，我们得到了由量子plpl克尔坐标的多正态序列生成的量子格拉斯曼的环面不变素理想，并给出了这些生成集的组合描述。我们还给出了O q(G mn (F)) {\mathcal O}_q(G_{mn}(\mathbb {F}))中环面不变素理想的偏序集的拓扑描述，并证明了环面不变对象的轨道方法的一个版本。最后，我们构造了O q(G mn (F)) {\mathcal O}_q(G_{mn}(\mathbb {F}))中所有环不变素数的分离Ore集。后者是Brown-Goodearl策略中建立(量子)格拉斯曼人轨道方法的第一步。

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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Total Positivity is a Quantum Phenomenon: The Grassmannian Case

The main aim of this paper is to establish a deep link between the totally nonnegative grassmannian and the quantum grassmannian. More precisely, under the assumption that the deformation parameter q q is transcendental, we show that “quantum positroids” are completely prime ideals in the quantum grassmannian O q ( G m n ( F ) ) {\mathcal O}_q(G_{mn}(\mathbb {F})) . As a consequence, we obtain that torus-invariant prime ideals in the quantum grassmannian are generated by polynormal sequences of quantum Plücker coordinates and give a combinatorial description of these generating sets. We also give a topological description of the poset of torus-invariant prime ideals in O q ( G m n ( F ) ) {\mathcal O}_q(G_{mn}(\mathbb {F})) , and prove a version of the orbit method for torus-invariant objects. Finally, we construct separating Ore sets for all torus-invariant primes in O q ( G m n ( F ) ) {\mathcal O}_q(G_{mn}(\mathbb {F})) . The latter is the first step in the Brown-Goodearl strategy to establish the orbit method for (quantum) grassmannians.

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来源期刊

Memoirs of the American Mathematical Society 数学-数学

CiteScore

3.50

自引率

5.30%

发文量

审稿时长

>12 weeks

期刊介绍： Memoirs of the American Mathematical Society is devoted to the publication of research in all areas of pure and applied mathematics. The Memoirs is designed particularly to publish long papers or groups of cognate papers in book form, and is under the supervision of the Editorial Committee of the AMS journal Transactions of the AMS. To be accepted by the editorial board, manuscripts must be correct, new, and significant. Further, they must be well written and of interest to a substantial number of mathematicians.

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