A new approach for numerical solution of Kuramoto-Tsuzuki equation

A fourth-order finite difference scheme for the Kuramoto-Tsuzuki equation is considered. The theoretical properties of the proposed scheme, such as the existence, uniqueness and the consistency errors are analyzed. The error estimates in a discrete maximum-norm show that the convergence rates of the difference scheme areof order O(h(4)+ k(2)). Some numerical experiments are reported to confirm the advantages of the proposed difference scheme by comparing it with other existing recent numerical methods. (c) 2022 IMACS. Published by Elsevier B.V. All rights reserved.