English

Energy diminishing implicit-explicit Runge--Kutta methods for gradient flows

Numerical Analysis 2024-03-22 v2 Numerical Analysis

Abstract

This study focuses on the development and analysis of a group of high-order implicit-explicit (IMEX) Runge--Kutta (RK) methods that are suitable for discretizing gradient flows with nonlinearity that is Lipschitz continuous. We demonstrate that these IMEX-RK methods can preserve the original energy dissipation property without any restrictions on the time-step size, thanks to a stabilization technique. The stabilization constants are solely dependent on the minimal eigenvalues that result from the Butcher tables of the IMEX-RKs. Furthermore, we establish a simple framework that can determine whether an IMEX-RK scheme is capable of preserving the original energy dissipation property or not. We also present a heuristic convergence analysis based on the truncation errors. This is the first research to prove that a linear high-order single-step scheme can ensure the original energy stability unconditionally for general gradient flows. Additionally, we provide several high-order IMEX-RK schemes that satisfy the established framework. Notably, we discovered a new four-stage third-order IMEX-RK scheme that reduces energy. Finally, we provide numerical examples to demonstrate the stability and accuracy properties of the proposed methods.

Keywords

Cite

@article{arxiv.2203.06034,
  title  = {Energy diminishing implicit-explicit Runge--Kutta methods for gradient flows},
  author = {Zhaohui Fu and Tao Tang and Jiang Yang},
  journal= {arXiv preprint arXiv:2203.06034},
  year   = {2024}
}
R2 v1 2026-06-24T10:10:09.262Z