条带上可积分聚合物的静态量纲

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS
Guillaume Barraquand, Ivan Corwin, Zongrui Yang
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引用次数: 0

摘要

我们证明,对角线条带上的几何最后通道渗流(LPP)和对数伽马聚合物模型的自由能增量过程的静止量是由两层吉布斯量的边际给出的,并有简单明了的描述。这一结果的显示受到控制条带边界权重参数的某些限制。然而,根据这一描述和一个解析延续论证,我们能够获得所有边界参数的静态量纲。利用条带中 log-gamma 聚合物静态量的中间无序极限,我们很容易恢复(聚合物收敛到开放 KPZ 方程的模态,猜想 4.2)来自(Barraquand, Le Doussal 在 Europhys.Lett.137(6):61003,2022)中对所有边界参数选择的开放式KPZ静态度量(\(u,v\in \mathbb{R}\)的猜想描述(从而超越了(Corwin, Knizel in Stationary measure for the open KPZ equation, 2021, arXiv:2103.12253)中的限制\(u+v\geq 0\))。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Stationary measures for integrable polymers on a strip

Stationary measures for integrable polymers on a strip

We prove that the stationary measures for the free-energy increment process for the geometric last passage percolation (LPP) and log-gamma polymer model on a diagonal strip is given by a marginal of a two-layer Gibbs measure with a simple and explicit description. This result is shown subject to certain restrictions on the parameters controlling the weights on the boundary of the strip. However, from this description and an analytic continuation argument we are able to access the stationary measure for all boundary parameters. Taking an intermediate disorder limit of the log-gamma polymer stationary measure in a strip we readily recover (modulo convergence of the polymer to the open KPZ equation, Conjecture 4.2) the conjectural description from (Barraquand, Le Doussal in Europhys. Lett. 137(6):61003, 2022) of the open KPZ stationary measure for all choices of boundary parameters \(u,v\in \mathbb{R}\) (thus going beyond the restriction \(u+v\geq 0\) from (Corwin, Knizel in Stationary measure for the open KPZ equation, 2021, arXiv:2103.12253)).

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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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