Modified Macdonald polynomials and the multispecies zero-range process: I

Q3 Mathematics
Arvind Ayyer, Olya Mandelshtam, James B. Martin
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引用次数: 6

Abstract

In this paper we prove a new combinatorial formula for the modified Macdonald polynomials H ˜ λ (X;q,t), motivated by connections to the theory of interacting particle systems from statistical mechanics. The formula involves a new statistic called queue inversions on fillings of tableaux. This statistic is closely related to the multiline queues which were recently used to give a formula for the Macdonald polynomials P λ (X;q,t). In the case q=1 and X=(1,1,⋯,1), that formula had also been shown to compute stationary probabilities for a particle system known as the multispecies ASEP on a ring, and it is natural to ask whether a similar connection exists between the modified Macdonald polynomials and a suitable statistical mechanics model. In a sequel to this work, we demonstrate such a connection, showing that the stationary probabilities of the multispecies totally asymmetric zero-range process (mTAZRP) on a ring can be computed using tableaux formulas with the queue inversion statistic. This connection extends to arbitrary X=(x 1 ,⋯,x n ); the x i play the role of site-dependent jump rates for the mTAZRP.
修正麦克唐纳多项式与多种零量程过程:1
本文从统计力学的相互作用粒子系统理论出发,证明了修正麦克唐纳多项式H ~ λ (X;q,t)的一个新的组合公式。该公式涉及一种新的统计,称为表的填充上的队列反转。这个统计量与最近用来给出麦克唐纳多项式P λ (X;q,t)公式的多行队列密切相关。在q=1和X=(1,1,⋯1)的情况下,该公式也被证明可以计算环上被称为多物种ASEP的粒子系统的平稳概率,并且很自然地要问修改的麦克唐纳多项式与合适的统计力学模型之间是否存在类似的联系。在本研究的后续中,我们证明了这种联系,表明环上的多物种完全不对称零距过程(mTAZRP)的平稳概率可以使用具有队列反转统计量的表aux公式计算。这种联系延伸到任意X=(X 1,⋯,X n);x i在mTAZRP中起位点依赖跳跃率的作用。
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
Algebraic Combinatorics
Algebraic Combinatorics Mathematics-Discrete Mathematics and Combinatorics
CiteScore
1.30
自引率
0.00%
发文量
45
审稿时长
51 weeks
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