Two Dualities: Markov and Schur–Weyl

Jeffrey Kuan
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引用次数: 7

Abstract

We show that quantum Schur-Weyl duality leads to Markov duality for a variety of asymmetric interacting particle systems. In particular, we consider three cases: (1) Using a Schur-Weyl duality between a two-parameter quantum group and a two-parameter Hecke algebra from arXiv:math/0108038, we recover the Markov self-duality of multi-species ASEP previously discovered in arXiv:1605.00691 and arXiv:1606.04587. (2) From a Schur-Weyl duality between a co-ideal subalgebra of a quantum group and a Hecke algebra of type B arXiv:1609.01766, we find a Markov duality for a multi-species open ASEP on the semi-infinite line. The duality functional has not previously appeared in the literature. (3) A "fused" Hecke algebra from arXiv:2001.11372 leads to a new process, which we call braided ASEP. In braided ASEP, up to m particles may occupy a site and up to m particles may jump at a time. The Schur-Weyl duality between this Hecke algebra and a quantum group lead to a Markov duality. The duality function had previously appeared as the duality function of the multi-species ASEP(q,m/2) arXiv:1605.00691 and the stochastic multi-species higher spin vertex model arXiv:1701.04468.
两种对偶性:马尔可夫和舒尔-魏尔
我们证明了量子Schur-Weyl对偶性导致各种不对称相互作用粒子系统的马尔可夫对偶性。(1)利用arXiv:math/0108038中的双参数量子群和双参数Hecke代数之间的Schur-Weyl对偶性,恢复了先前在arXiv:1605.00691和arXiv:1606.04587中发现的多物种ASEP的Markov自对偶性。(2)从量子群的共理想子代数与B型Hecke代数之间的Schur-Weyl对偶中,得到了半无穷线上多种开ASEP的Markov对偶。对偶泛函以前没有在文献中出现过。(3) arXiv:2001.11372的“融合”Hecke代数导致了一个新的过程,我们称之为编织ASEP。在编织ASEP中,最多m个粒子可以占据一个位点,同时最多m个粒子可以跳跃。赫克代数和量子群之间的Schur-Weyl对偶导致了马尔可夫对偶。该对偶函数先前以多物种ASEP(q,m/2) arXiv:1605.00691和随机多物种高自旋顶点模型arXiv:1701.04468的对偶函数出现。
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