Asymptotic Analysis for the Generalized Langevin Equation with Singular Potentials

IF 2.6 2区数学 Q1 MATHEMATICS, APPLIED Journal of Nonlinear Science Pub Date : 2024-05-14 DOI:10.1007/s00332-024-10027-5

Manh Hong Duong, Hung Dang Nguyen

引用次数: 0

Abstract

We consider a system of interacting particles governed by the generalized Langevin equation (GLE) in the presence of external confining potentials, singular repulsive forces, as well as memory kernels. Using a Mori–Zwanzig approach, we represent the system by a class of Markovian dynamics. Under a general set of conditions on the nonlinearities, we study the large-time asymptotics of the multi-particle Markovian GLEs. We show that the system is always exponentially attractive toward the unique invariant Gibbs probability measure. The proof relies on a novel construction of Lyapunov functions. We then establish the validity of the small-mass approximation for the solutions by an appropriate equation on any finite-time window. Important examples of singular potentials in our results include the Lennard–Jones and Coulomb functions.

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具有奇异势的广义朗文方程的渐近分析

我们考虑了一个在外部约束势、奇异斥力以及记忆核存在的情况下受广义朗文方程（GLE）支配的相互作用粒子系统。我们采用莫里-茨万齐格（Mori-Zwanzig）方法，用一类马尔可夫动力学来表示该系统。在非线性的一般条件下，我们研究了多粒子马尔可夫 GLE 的大时间渐近性。我们证明，该系统总是对唯一不变的吉布斯概率量具有指数吸引力。证明依赖于一种新颖的 Lyapunov 函数构造。然后，我们通过任何有限时间窗口上的适当方程，建立了解的小质量近似的有效性。在我们的结果中，奇异势的重要例子包括伦纳德-琼斯函数和库仑函数。

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

Journal of Nonlinear Science 数学-力学

CiteScore

5.00

自引率

3.30%

发文量

审稿时长

4.5 months

期刊介绍： The mission of the Journal of Nonlinear Science is to publish papers that augment the fundamental ways we describe, model, and predict nonlinear phenomena. Papers should make an original contribution to at least one technical area and should in addition illuminate issues beyond that area''s boundaries. Even excellent papers in a narrow field of interest are not appropriate for the journal. Papers can be oriented toward theory, experimentation, algorithms, numerical simulations, or applications as long as the work is creative and sound. Excessively theoretical work in which the application to natural phenomena is not apparent (at least through similar techniques) or in which the development of fundamental methodologies is not present is probably not appropriate. In turn, papers oriented toward experimentation, numerical simulations, or applications must not simply report results without an indication of what a theoretical explanation might be. All papers should be submitted in English and must meet common standards of usage and grammar. In addition, because ours is a multidisciplinary subject, at minimum the introduction to the paper should be readable to a broad range of scientists and not only to specialists in the subject area. The scientific importance of the paper and its conclusions should be made clear in the introduction-this means that not only should the problem you study be presented, but its historical background, its relevance to science and technology, the specific phenomena it can be used to describe or investigate, and the outstanding open issues related to it should be explained. Failure to achieve this could disqualify the paper.