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Main Authors: Chen, Zhichao, Wang, Hao, Pan, Licheng, Ma, Yiran, Teng, Yunfei, Ma, Jiaze, Yao, Le, Ge, Zhiqiang, Song, Zhihuan
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2507.20277
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author Chen, Zhichao
Wang, Hao
Pan, Licheng
Ma, Yiran
Teng, Yunfei
Ma, Jiaze
Yao, Le
Ge, Zhiqiang
Song, Zhihuan
author_facet Chen, Zhichao
Wang, Hao
Pan, Licheng
Ma, Yiran
Teng, Yunfei
Ma, Jiaze
Yao, Le
Ge, Zhiqiang
Song, Zhihuan
contents In this paper, we address the issue of model specification in probabilistic latent variable models (PLVMs) using an infinite-horizon optimal control approach. Traditional PLVMs rely on joint distributions to model complex data, but introducing latent variables results in an ill-posed parameter learning problem. To address this issue, regularization terms are typically introduced, leading to the development of the expectation-maximization (EM) algorithm, where the latent variable distribution is restricted to a predefined normalized distribution family to facilitate the expectation step. To overcome this limitation, we propose representing the latent variable distribution as a finite set of instances perturbed via an ordinary differential equation with a control policy. This approach ensures that the instances asymptotically converge to the true latent variable distribution as time approaches infinity. By doing so, we reformulate the distribution inference problem as an optimal control policy determination problem, relaxing the model specification to an infinite-horizon path space. Building on this formulation, we derive the corresponding optimal control policy using the Pontryagin's maximum principle and provide a closed-form expression for its implementation using the reproducing kernel Hilbert space. After that, we develop a novel, convergence-guaranteed EM algorithm for PLVMs based on this infinite-horizon-optimal-control-based inference strategy. Finally, extensive experiments are conducted to validate the effectiveness and superiority of the proposed approach.
format Preprint
id arxiv_https___arxiv_org_abs_2507_20277
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Relaxing Probabilistic Latent Variable Models' Specification via Infinite-Horizon Optimal Control
Chen, Zhichao
Wang, Hao
Pan, Licheng
Ma, Yiran
Teng, Yunfei
Ma, Jiaze
Yao, Le
Ge, Zhiqiang
Song, Zhihuan
Systems and Control
In this paper, we address the issue of model specification in probabilistic latent variable models (PLVMs) using an infinite-horizon optimal control approach. Traditional PLVMs rely on joint distributions to model complex data, but introducing latent variables results in an ill-posed parameter learning problem. To address this issue, regularization terms are typically introduced, leading to the development of the expectation-maximization (EM) algorithm, where the latent variable distribution is restricted to a predefined normalized distribution family to facilitate the expectation step. To overcome this limitation, we propose representing the latent variable distribution as a finite set of instances perturbed via an ordinary differential equation with a control policy. This approach ensures that the instances asymptotically converge to the true latent variable distribution as time approaches infinity. By doing so, we reformulate the distribution inference problem as an optimal control policy determination problem, relaxing the model specification to an infinite-horizon path space. Building on this formulation, we derive the corresponding optimal control policy using the Pontryagin's maximum principle and provide a closed-form expression for its implementation using the reproducing kernel Hilbert space. After that, we develop a novel, convergence-guaranteed EM algorithm for PLVMs based on this infinite-horizon-optimal-control-based inference strategy. Finally, extensive experiments are conducted to validate the effectiveness and superiority of the proposed approach.
title Relaxing Probabilistic Latent Variable Models' Specification via Infinite-Horizon Optimal Control
topic Systems and Control
url https://arxiv.org/abs/2507.20277