Arbitrary high-order linear structure-preserving schemes for the regularized long-wave equation
Abstract
In this paper, a class of arbitrarily high-order linear momentum-preserving and energy-preserving schemes are proposed, respectively, for solving the regularized long-wave equation. For the momentum-preserving scheme, the key idea is based on the extrapolation/prediction-correction technique and the symplectic Runge-Kutta method in time, together with the standard Fourier pseudo-spectral method in space. We show that the scheme is linear, high-order, unconditionally stable and preserves the discrete momentum of the system. For the energy-preserving scheme, it is mainly based on the energy quadratization approach and the analogous linearized strategy used in the construction of the linear momentum-preserving scheme. The proposed scheme is linear, high-order and can preserve a discrete quadratic energy exactly. Numerical results are addressed to demonstrate the accuracy and efficiency of the proposed scheme.
Keywords
Cite
@article{arxiv.2105.03930,
title = {Arbitrary high-order linear structure-preserving schemes for the regularized long-wave equation},
author = {Chaolong Jiang and Xu Qian and Songhe Song and Jin Cui},
journal= {arXiv preprint arXiv:2105.03930},
year = {2021}
}
Comments
26 pages, 52 figures