摄动(天文学)
不变(物理)
数学
人工神经网络
统计物理学
格子(音乐)
数学分析
应用数学
物理
计算机科学
数学物理
量子力学
声学
人工智能
作者
Tomás Caraballo,Zhang Chen,Lingyu Li
摘要
.This paper is mainly concerned with limiting behaviors of invariant measures for neural field lattice models in a random environment. First of all, we consider the convergence relation of invariant measures between the stochastic neural field lattice model and the corresponding deterministic model in weighted spaces, and prove any limit of a sequence of invariant measures of such a lattice model must be an invariant measure of its limiting system as the noise intensity tends to zero. Then we are devoted to studying the numerical approximation of invariant measures of such a stochastic neural lattice model. To this end, we first consider convergence of invariant measures between such a neural lattice model and the system with neurons only interacting with its n-neighborhood; then we further prove the convergence relation of invariant measures between the system with an n-neighborhood and its finite dimensional truncated system. By this procedure, the invariant measure of the stochastic neural lattice models can be approximated by the numerical invariant measure of a finite dimensional truncated system based on the backward Euler–Maruyama (BEM) scheme. Therefore, the invariant measure of a deterministic neural field lattice model can be observed by the invariant measure of the BEM scheme when the noise is not negligible.Keywordsstochastic neural field lattice modelweighted spacenonlinear white noiseinvariant measurenumerical invariant measureMSC codes60H1037L4037L55
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