Gibbs测度是非线性哈密顿偏微分方程的唯一KMS平衡态

IF 1.3 2区 数学 Q1 MATHEMATICS Revista Matematica Iberoamericana Pub Date : 2021-02-24 DOI:10.4171/rmi/1366
Z. Ammari, Vedran Sohinger
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引用次数: 4

摘要

经典Kubo-Martin-Schwinger (KMS)条件是描述无限经典力学系统平衡的统计力学基本性质。它是在70年代由G. Gallavotti和E. Verboven引入的,作为Dobrushin-Lanford-Ruelle (DLR)方程的替代方案。在本文中,我们在非线性哈密顿偏微分方程的框架中考虑这一概念,并讨论其相关性。特别地,我们证明了吉布斯测度是这类系统唯一的KMS平衡态。我们的证明是基于Malliavin微积分和Gross-Sobolev空间。我们工作的主要特点是我们的结果适用于白噪声、抽象维纳空间和高斯概率空间的一般背景,以及非线性薛定谔、哈特里和波(克莱因-戈登)方程等偏微分方程的基本例子。
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Gibbs measures as unique KMS equilibrium states of nonlinear Hamiltonian PDEs
The classical Kubo-Martin-Schwinger (KMS) condition is a fundamental property of statistical mechanics characterizing the equilibrium of infinite classical mechanical systems. It was introduced in the seventies by G. Gallavotti and E. Verboven as an alternative to the Dobrushin-Lanford-Ruelle (DLR) equation. In this article, we consider this concept in the framework of nonlinear Hamiltonian PDEs and discuss its relevance. In particular, we prove that Gibbs measures are the unique KMS equilibrium states for such systems. Our proof is based on Malliavin calculus and Gross-Sobolev spaces. The main feature of our work is the applicability of our results to the general context of white noise, abstract Wiener spaces and Gaussian probability spaces, as well as to fundamental examples of PDEs like the nonlinear Schrodinger, Hartree, and wave (Klein-Gordon) equations.
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来源期刊
CiteScore
2.40
自引率
0.00%
发文量
61
审稿时长
>12 weeks
期刊介绍: Revista Matemática Iberoamericana publishes original research articles on all areas of mathematics. Its distinguished Editorial Board selects papers according to the highest standards. Founded in 1985, Revista is a scientific journal of Real Sociedad Matemática Española.
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