分数布朗运动驱动的混合快慢系统的平均原理

Pub Date : 2020-01-20 DOI:10.1215/21562261-2023-0001
B. Pei, Y. Inahama, Yong Xu
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引用次数: 15

摘要

我们的重点是快慢系统涉及分数布朗运动(fBm)和标准布朗运动(Bm)。关于Bm的积分是标准的Ito积分,关于fBm的积分是使用分数阶微积分工具的广义Riemann-Stieltjes积分。建立了快慢系统的快变扩散过程作为噪声在极限处被平均的平均原理。结果表明,慢过程在均方意义上有一个极限,其特征是由fBm驱动的随机微分方程的解,其系数相对于快变扩散的平稳测度平均。这意味着人们可以忽略复杂的原始系统,而将注意力集中在平均系统上。这种平均原理为降低计算复杂度铺平了道路。
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Averaging principles for mixed fast-slow systems driven by fractional Brownian motion
We focus on fast-slow systems involving both fractional Brownian motion (fBm) and standard Brownian motion (Bm). The integral with respect to Bm is the standard Ito integral, and the integral with respect to fBm is the generalised Riemann-Stieltjes integral using the tools of fractional calculus. An averaging principle in which the fast-varying diffusion process of the fast-slow systems acts as a noise to be averaged out in the limit is established. It is shown that the slow process has a limit in the mean square sense, which is characterized by the solution of stochastic differential equations driven by fBm whose coefficients are averaged with respect to the stationary measure of the fast-varying diffusion. The implication is that one can ignore the complex original systems and concentrate on the averaged systems instead. This averaging principle paves the way for reduction of computational complexity.
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