Efficient and Flexible Multirate Temporal Adaptivity
Abstract
In this work we present two new families of multirate time step adaptivity controllers, that are designed to work with embedded multirate infinitesimal (MRI) time integration methods for adapting time steps when solving problems with multiple time scales. We compare these controllers against competing approaches on two benchmark problems, showing that the proposed methods offer dramatically improved performance and flexibility. The combination of embedded MRI methods and the proposed controllers enable adaptive simulations of problems with a potentially arbitrary number of time scales, achieving high accuracy while maintaining low computational cost. Additionally, we introduce a new set of embeddings for the family of explicit multirate exponential Runge--Kutta (MERK) methods of orders 2 through 5, resulting in the first-ever fifth-order embedded MRI method. Finally, we compare the performance of a wide range of embedded MRI methods on our benchmark problems to provide guidance on how to select an appropriate MRI method and multirate controller.
Keywords
Cite
@article{arxiv.2510.14964,
title = {Efficient and Flexible Multirate Temporal Adaptivity},
author = {Daniel R. Reynolds and Sylvia Amihere and Dashon Mitchell and Vu Thai Luan},
journal= {arXiv preprint arXiv:2510.14964},
year = {2026}
}