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Main Authors: Durastante, Fabio, Gnazzo, Miryam, Meini, Beatrice
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.16762
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author Durastante, Fabio
Gnazzo, Miryam
Meini, Beatrice
author_facet Durastante, Fabio
Gnazzo, Miryam
Meini, Beatrice
contents We address the algorithmic problem of determining the reversible Markov chain $\tilde X$ that is closest to a given Markov chain $X$, with an identical stationary distribution. More specifically, $\tilde X$ is the reversible Markov chain with the closest transition matrix, in the Frobenius norm, to the transition matrix of $X$. To compute the transition matrix of $\tilde X$, we propose a novel approach based on Riemannian optimization. Our method introduces a modified multinomial manifold endowed with a prescribed stationary vector, while also satisfying the detailed balance conditions, all within the framework of the Fisher metric. We evaluate the performance of the proposed approach in comparison with an existing quadratic programming method and demonstrate its effectiveness through a series of synthetic experiments, as well as in the construction of a reversible Markov chain from transition count data obtained via direct estimation from a stochastic differential equation.
format Preprint
id arxiv_https___arxiv_org_abs_2505_16762
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle A Riemannian Optimization Approach for Finding the Nearest Reversible Markov Chain
Durastante, Fabio
Gnazzo, Miryam
Meini, Beatrice
Numerical Analysis
We address the algorithmic problem of determining the reversible Markov chain $\tilde X$ that is closest to a given Markov chain $X$, with an identical stationary distribution. More specifically, $\tilde X$ is the reversible Markov chain with the closest transition matrix, in the Frobenius norm, to the transition matrix of $X$. To compute the transition matrix of $\tilde X$, we propose a novel approach based on Riemannian optimization. Our method introduces a modified multinomial manifold endowed with a prescribed stationary vector, while also satisfying the detailed balance conditions, all within the framework of the Fisher metric. We evaluate the performance of the proposed approach in comparison with an existing quadratic programming method and demonstrate its effectiveness through a series of synthetic experiments, as well as in the construction of a reversible Markov chain from transition count data obtained via direct estimation from a stochastic differential equation.
title A Riemannian Optimization Approach for Finding the Nearest Reversible Markov Chain
topic Numerical Analysis
url https://arxiv.org/abs/2505.16762