Related papers: Neural Spline Operators for Risk Quantification in Stochastic Systems

Neural Spline Operators for Risk Quantification in Stochastic Systems

URL: http://arxiv.org/abs/2508.20288v1
Date: Wed, 27 Aug 2025 21:46:01 GMT
Title: Neural Spline Operators for Risk Quantification in Stochastic Systems
Authors: Zhuoyuan Wang, Raffaele Romagnoli, Kamyar Azizzadenesheli, Yorie Nakahira,
Abstract summary: Accurately quantifying long-term risk probabilities in diverse systems is essential for safety-critical control.<n>We introduce physics-informed neural operator (PINO) methods to risk quantification problems.<n>Specifically, we propose Neural Spline Operators (NeSO), a PINO framework that leverages B-spline representations to improve training efficiency and achieve better initial and boundary condition enforcements.
Score: 14.121384596390293
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Accurately quantifying long-term risk probabilities in diverse stochastic systems is essential for safety-critical control. However, existing sampling-based and partial differential equation (PDE)-based methods often struggle to handle complex varying dynamics. Physics-informed neural networks learn surrogate mappings for risk probabilities from varying system parameters of fixed and finite dimensions, yet can not account for functional variations in system dynamics. To address these challenges, we introduce physics-informed neural operator (PINO) methods to risk quantification problems, to learn mappings from varying \textit{functional} system dynamics to corresponding risk probabilities. Specifically, we propose Neural Spline Operators (NeSO), a PINO framework that leverages B-spline representations to improve training efficiency and achieve better initial and boundary condition enforcements, which are crucial for accurate risk quantification. We provide theoretical analysis demonstrating the universal approximation capability of NeSO. We also present two case studies, one with varying functional dynamics and another with high-dimensional multi-agent dynamics, to demonstrate the efficacy of NeSO and its significant online speed-up over existing methods. The proposed framework and the accompanying universal approximation theorem are expected to be beneficial for other control or PDE-related problems beyond risk quantification.

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