A Galerkin approach to solitary wave propagation for the second-order nonlinear evolution equation based on quartic B-spline functions

Azhar Iqbal; Muhammad Abbas; Tayyaba Akram; Abdullah M. Alsharif; Ajmal Ali

doi:10.1080/00207160.2022.2039388

A Galerkin approach to solitary wave propagation for the second-order nonlinear evolution equation based on quartic B-spline functions

Azhar Iqbal^*
, Muhammad Abbas^*
, Tayyaba Akram
, Abdullah M. Alsharif
, Ajmal Ali

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

Abstract

This article aims to produce efficient numerical results using the Galerkin approach and quartic B-spline functions for the one-dimensional second-order nonlinear evolution equation. The quartic B-spline functions are used as the shape and weight functions for the Galerkin method. The time derivative and space parameters are discretized by the finite difference and Crank–Nicolson schemes, respectively. A Galerkin approach is investigated by propagating waves at various times and comparisons are made with published papers. The obtained results show that the scheme presented good results and conservations laws are all adequately obeyed.

Original language	English
Pages (from-to)	2205-2220
Number of pages	16
Journal	International Journal of Computer Mathematics
Volume	99
Issue number	11
DOIs	https://doi.org/10.1080/00207160.2022.2039388
State	Published - 2022
Externally published	Yes

Bibliographical note

Publisher Copyright:
© 2022 Informa UK Limited, trading as Taylor & Francis Group.

Keywords

41A15
65D07
65M60
65N30
74J35
CNLS equation
Galerkin method
Quartic B-spline functions
solitary wave propagation

ASJC Scopus subject areas

Computer Science Applications
Computational Theory and Mathematics
Applied Mathematics

Access to Document

10.1080/00207160.2022.2039388

Cite this

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title = "A Galerkin approach to solitary wave propagation for the second-order nonlinear evolution equation based on quartic B-spline functions",

abstract = "This article aims to produce efficient numerical results using the Galerkin approach and quartic B-spline functions for the one-dimensional second-order nonlinear evolution equation. The quartic B-spline functions are used as the shape and weight functions for the Galerkin method. The time derivative and space parameters are discretized by the finite difference and Crank–Nicolson schemes, respectively. A Galerkin approach is investigated by propagating waves at various times and comparisons are made with published papers. The obtained results show that the scheme presented good results and conservations laws are all adequately obeyed.",

keywords = "41A15, 65D07, 65M60, 65N30, 74J35, CNLS equation, Galerkin method, Quartic B-spline functions, solitary wave propagation",

author = "Azhar Iqbal and Muhammad Abbas and Tayyaba Akram and Alsharif, \{Abdullah M.\} and Ajmal Ali",

note = "Publisher Copyright: {\textcopyright} 2022 Informa UK Limited, trading as Taylor \& Francis Group.",

year = "2022",

doi = "10.1080/00207160.2022.2039388",

language = "English",

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journal = "International Journal of Computer Mathematics",

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T1 - A Galerkin approach to solitary wave propagation for the second-order nonlinear evolution equation based on quartic B-spline functions

AU - Iqbal, Azhar

AU - Abbas, Muhammad

AU - Akram, Tayyaba

AU - Alsharif, Abdullah M.

AU - Ali, Ajmal

PY - 2022

Y1 - 2022

N2 - This article aims to produce efficient numerical results using the Galerkin approach and quartic B-spline functions for the one-dimensional second-order nonlinear evolution equation. The quartic B-spline functions are used as the shape and weight functions for the Galerkin method. The time derivative and space parameters are discretized by the finite difference and Crank–Nicolson schemes, respectively. A Galerkin approach is investigated by propagating waves at various times and comparisons are made with published papers. The obtained results show that the scheme presented good results and conservations laws are all adequately obeyed.

AB - This article aims to produce efficient numerical results using the Galerkin approach and quartic B-spline functions for the one-dimensional second-order nonlinear evolution equation. The quartic B-spline functions are used as the shape and weight functions for the Galerkin method. The time derivative and space parameters are discretized by the finite difference and Crank–Nicolson schemes, respectively. A Galerkin approach is investigated by propagating waves at various times and comparisons are made with published papers. The obtained results show that the scheme presented good results and conservations laws are all adequately obeyed.

KW - 41A15

KW - 65D07

KW - 65M60

KW - 65N30

KW - 74J35

KW - CNLS equation

KW - Galerkin method

KW - Quartic B-spline functions

KW - solitary wave propagation

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JO - International Journal of Computer Mathematics

JF - International Journal of Computer Mathematics

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ER -

A Galerkin approach to solitary wave propagation for the second-order nonlinear evolution equation based on quartic B-spline functions

Abstract

Bibliographical note

Keywords

ASJC Scopus subject areas

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