Roberts, StevenPopov, Andrey A.Sarshar, ArashSandu, Adrian2023-02-282023-02-282022-01-011064-8275http://hdl.handle.net/10919/113997Simulation of complex dynamical systems arising in many applications is computationally challenging due to their size and complexity. Model order reduction, machine learning, and other types of surrogate modeling techniques offer cheaper and simpler ways to describe the dynamics of these systems but are inexact and introduce additional approximation errors. In order to overcome the computational difficulties of the full complex models, on one hand, and the limitations of surrogate models, on the other, this work proposes a new accelerated time-stepping strategy that combines information from both. This approach is based on the multirate infinitesimal general-structure additive Runge–Kutta framework. The inexpensive surrogate model is integrated with a small time step to guide the solution trajectory, and the full model is treated with a large time step to occasionally correct for the surrogate model error and ensure convergence. We provide a theoretical error analysis, and several numerical experiments, to show that this approach can be significantly more efficient than using only the full or only the surrogate model for the integration.Pages A1405-A1427application/pdfenIn CopyrightA Fast Time-Stepping Strategy for Dynamical Systems Equipped With a Surrogate ModelArticle - Refereed2023-02-25SIAM Journal on Scientific Computinghttps://doi.org/10.1137/20M1386281443Sandu, Adrian [0000-0002-5380-0103]1095-7197