English

Meta-State-Space Learning: An Identification Approach for Stochastic Dynamical Systems

Systems and Control 2024-05-02 v2 Systems and Control

Abstract

Available methods for identification of stochastic dynamical systems from input-output data generally impose restricting structural assumptions on either the noise structure in the data-generating system or the possible state probability distributions. In this paper, we introduce a novel identification method of such systems, which results in a dynamical model that is able to produce the time-varying output distribution accurately without taking restrictive assumptions on the data-generating process. The method is formulated by first deriving a novel and exact representation of a wide class of nonlinear stochastic systems in a so-called meta-state-space form, where the meta-state can be interpreted as a parameter vector of a state probability function space parameterization. As the resulting representation of the meta-state dynamics is deterministic, we can capture the stochastic system based on a deterministic model, which is highly attractive for identification. The meta-state-space representation often involves unknown and heavily nonlinear functions, hence, we propose an Artificial Neural Network (ANN)-based identification method capable of efficiently learning nonlinear meta-state-space models. We demonstrate that the proposed identification method can obtain models with a log-likelihood close to the theoretical limit even for highly nonlinear, highly stochastic systems.

Keywords

Cite

@article{arxiv.2307.06675,
  title  = {Meta-State-Space Learning: An Identification Approach for Stochastic Dynamical Systems},
  author = {Gerben I. Beintema and Maarten Schoukens and Roland Tóth},
  journal= {arXiv preprint arXiv:2307.06675},
  year   = {2024}
}

Comments

Accepted in Automatica

R2 v1 2026-06-28T11:29:17.694Z