New conservative difference schemes with fourth-order accuracy for some model equation for nonlinear dispersive waves

Ahlem Ghiloufi; Khaled Omrani

doi:10.1002/num.22208

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New conservative difference schemes with fourth-order accuracy for some model equation for nonlinear dispersive waves

Journal article

Peer reviewed

New conservative difference schemes with fourth-order accuracy for some model equation for nonlinear dispersive waves

Ahlem Ghiloufi and Khaled Omrani

Numerical methods for partial differential equations, Vol.34(2), pp.451-500

01/03/2018

DOI: https://doi.org/10.1002/num.22208

Abstract

Mathematics

Mathematics, Applied

Physical Sciences

Science & Technology

In this article, some high-order accurate difference schemes of dispersive shallow water waves with Rosenau-KdV-RLW-equation are presented. The corresponding conservative quantities are discussed. Existence of the numerical solution has been shown. A priori estimates, convergence, uniqueness, and stability of the difference schemes are proved. The convergence order is O(h(4) + k(2)) in the uniform norm without any restrictions on the mesh sizes. At last numerical results are given to support the theoretical analysis.

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Title: New conservative difference schemes with fourth-order accuracy for some model equation for nonlinear dispersive waves
Creators - without role: Ahlem Ghiloufi - University of Sousse
Khaled Omrani - University of Sousse
Publication Details: Numerical methods for partial differential equations, Vol.34(2), pp.451-500
Publisher: Wiley
Number of pages: 50
Identifiers: 9910985408331
Academic Unit: Taif University
Language: English
Resource Type: Journal article