English

Robust high-order low-rank BUG integrators based on explicit Runge--Kutta methods

Numerical Analysis 2026-01-27 v6 Numerical Analysis Dynamical Systems

Abstract

In this work, we introduce high-order Basis-Update & Galerkin (BUG) integrators based on explicit Runge-Kutta methods for large-scale matrix differential equations. These dynamical low-rank integrators extend the BUG integrator to arbitrary explicit Runge-Kutta schemes by performing a BUG step at each stage of the method. The resulting Runge-Kutta BUG (RK-BUG) integrators are robust with respect to small singular values, fully forward in time, and high-order accurate, while enabling conservation and rank adaptivity. We prove that RK-BUG integrators retain the order of convergence of the underlying Runge-Kutta method until the error reaches a plateau corresponding to the low-rank truncation error, which vanishes as the rank becomes full. This theoretical analysis is supported by several numerical experiments. The results demonstrate the high-order convergence of the RK-BUG integrator and its superior accuracy compared to other existing dynamical low-rank integrators.

Keywords

Cite

@article{arxiv.2502.07040,
  title  = {Robust high-order low-rank BUG integrators based on explicit Runge--Kutta methods},
  author = {Fabio Nobile and Sébastien Riffaud},
  journal= {arXiv preprint arXiv:2502.07040},
  year   = {2026}
}
R2 v1 2026-06-28T21:39:25.189Z