English

Tensor network approximation of Koopman operators

Dynamical Systems 2025-12-30 v2 Quantum Physics

Abstract

We propose a tensor network framework for approximating the evolution of observables of measure-preserving ergodic systems. Our approach is based on a spectrally-convergent approximation of the skew-adjoint Koopman generator by a diagonalizable, skew-adjoint operator WτW_\tau that acts on a reproducing kernel Hilbert space Hτ\mathcal H_\tau with coalgebra structure and Banach algebra structure under the pointwise product of functions. Leveraging this structure, we lift the unitary evolution operators etWτe^{t W_\tau} (which can be thought of as regularized Koopman operators) to a unitary evolution group on the Fock space F(Hτ)F(\mathcal H_\tau) generated by Hτ\mathcal H_\tau that acts multiplicatively with respect to the tensor product. Our scheme also employs a representation of classical observables (LL^\infty functions of the state) by quantum observables (self-adjoint operators) acting on the Fock space, and a representation of probability densities in L1L^1 by quantum states. Combining these constructions leads to an approximation of the Koopman evolution of observables that is representable as evaluation of a tree tensor network built on a tensor product subspace HτnF(Hτ)\mathcal H_\tau^{\otimes n} \subset F(\mathcal H_\tau) of arbitrarily high grading nNn \in \mathbb N. A key feature of this quantum-inspired approximation is that it captures information from a tensor product space of dimension (2d+1)n(2d+1)^n, generated from a collection of 2d+12d + 1 eigenfunctions of WτW_\tau. Furthermore, the approximation is positivity preserving. The paper contains a theoretical convergence analysis of the method and numerical applications to two dynamical systems on the 2-torus: an ergodic torus rotation as an example with pure point Koopman spectrum and a Stepanoff flow as an example with topological weak mixing.

Keywords

Cite

@article{arxiv.2407.07242,
  title  = {Tensor network approximation of Koopman operators},
  author = {Dimitrios Giannakis and Mohammad Javad Latifi Jebelli and Michael Montgomery and Philipp Pfeffer and Jörg Schumacher and Joanna Slawinska},
  journal= {arXiv preprint arXiv:2407.07242},
  year   = {2025}
}

Comments

53 pages, 11 figures

R2 v1 2026-06-28T17:34:59.395Z