当快速过程具有多个不变测度时,慢-快动力学的研究

IF 2.9 3区 综合性期刊 Q1 MULTIDISCIPLINARY SCIENCES
B. D. Goddard, M. Ottobre, K. J. Painter, I. Souttar
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引用次数: 1

摘要

从数学生物学的应用出发,研究了慢速系统的平均问题,其中快速动力学是一个具有多个不变测度的随机过程。我们既考虑了快速过程与慢过程解耦的情况,也考虑了两个组件完全耦合的情况。我们研究了慢过程根据常微分方程(ODE)演化而快速过程是有限状态空间的连续时间马尔可夫过程的情况,并表明,在这种情况下,极限(平均)动力学可以描述为随机ODE(即随机系数的ODE)。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
On the study of slow–fast dynamics, when the fast process has multiple invariant measures
Motivated by applications to mathematical biology, we study the averaging problem for slow–fast systems, in the case in which the fast dynamics is a stochastic process with multiple invariant measures . We consider both the case in which the fast process is decoupled from the slow process and the case in which the two components are fully coupled. We work in the setting in which the slow process evolves according to an ordinary differential equation (ODE) and the fast process is a continuous time Markov process with finite state space and show that, in this setting, the limiting (averaged) dynamics can be described as a random ODE (i.e. an ODE with random coefficients).
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来源期刊
CiteScore
6.40
自引率
5.70%
发文量
227
审稿时长
3.0 months
期刊介绍: Proceedings A has an illustrious history of publishing pioneering and influential research articles across the entire range of the physical and mathematical sciences. These have included Maxwell"s electromagnetic theory, the Braggs" first account of X-ray crystallography, Dirac"s relativistic theory of the electron, and Watson and Crick"s detailed description of the structure of DNA.
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