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Main Author: Jafarizadeh, Saber
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2412.20934
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author Jafarizadeh, Saber
author_facet Jafarizadeh, Saber
contents Of stochastic differential equations, diffusion processes have been adopted in numerous applications, as more relevant and flexible models. This paper studies diffusion processes in a different setting, where for a given stationary distribution and average variance, it seeks the diffusion process with optimal convergence rate. It is shown that the optimal drift function is a linear function and the convergence rate of the stochastic process is bounded by the ratio of the average variance to the variance of the stationary distribution. Furthermore, the concavity of the optimal relaxation time as a function of the stationary distribution has been proven, and it is shown that all Pearson diffusion processes of the Hypergeometric type with polynomial functions of at most degree two as the variance functions are optimal.
format Preprint
id arxiv_https___arxiv_org_abs_2412_20934
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Optimal Diffusion Processes
Jafarizadeh, Saber
Probability
Information Theory
Of stochastic differential equations, diffusion processes have been adopted in numerous applications, as more relevant and flexible models. This paper studies diffusion processes in a different setting, where for a given stationary distribution and average variance, it seeks the diffusion process with optimal convergence rate. It is shown that the optimal drift function is a linear function and the convergence rate of the stochastic process is bounded by the ratio of the average variance to the variance of the stationary distribution. Furthermore, the concavity of the optimal relaxation time as a function of the stationary distribution has been proven, and it is shown that all Pearson diffusion processes of the Hypergeometric type with polynomial functions of at most degree two as the variance functions are optimal.
title Optimal Diffusion Processes
topic Probability
Information Theory
url https://arxiv.org/abs/2412.20934