English

Learning Stochastic Nonlinear Dynamics with Embedded Latent Transfer Operators

Machine Learning 2026-05-08 v3

Abstract

We consider an operator-based latent Markov representation of a stochastic nonlinear dynamical system, where the stochastic evolution of the latent state embedded in a reproducing kernel Hilbert space is described with the corresponding transfer operator, and develop a spectral method to learn this representation based on the theory of stochastic realization. The embedding may be learned simultaneously using reproducing kernels, for example, constructed with feed-forward neural networks. We also address the generalization of sequential state-estimation (Kalman filtering) in stochastic nonlinear systems, and of operator-based eigen-mode decomposition of dynamics, for the representation. Several examples with synthetic and real-world data are shown to illustrate the empirical characteristics of our methods, and to investigate the performance of our model in sequential state-estimation and mode decomposition.

Keywords

Cite

@article{arxiv.2501.02721,
  title  = {Learning Stochastic Nonlinear Dynamics with Embedded Latent Transfer Operators},
  author = {Naichang Ke and Ryogo Tanaka and Yoshinobu Kawahara},
  journal= {arXiv preprint arXiv:2501.02721},
  year   = {2026}
}
R2 v1 2026-06-28T20:57:06.756Z