On unconditionally stable new modified fractional group iterative scheme for the solution of 2d time-fractional telegraph model

Ajmal Ali; Thabet Abdeljawad; Azhar Iqbal; Tayyaba Akram; Muhammad Abbas

doi:10.3390/sym13112078

On unconditionally stable new modified fractional group iterative scheme for the solution of 2d time-fractional telegraph model

Ajmal Ali
, Thabet Abdeljawad^*
, Azhar Iqbal
, Tayyaba Akram
, Muhammad Abbas^*

^*Corresponding author for this work

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

9 Scopus citations

Abstract

In this study, a new modified group iterative scheme for solving the two-dimensional (2D) fractional hyperbolic telegraph differential equation with Dirichlet boundary conditions is obtained from the 2h-spaced standard and rotated Crank–Nicolson FD approximations. The findings of new four-point modified explicit group relaxation method demonstrates the rapid rate of convergence of proposed method as compared to the existing schemes. Numerical tests are performed to test the capability of the group iterative scheme in comparison with the point iterative scheme counter-parts. The stability of the derived modified group method is proven by the matrix norm algorithm. The obtained results are tabulated and concluded that exact solutions are exactly symmetric with approximate solutions.

Original language	English
Article number	2078
Journal	Symmetry
Volume	13
Issue number	11
DOIs	https://doi.org/10.3390/sym13112078
State	Published - Nov 2021
Externally published	Yes

Bibliographical note

Publisher Copyright:
© 2021 by the authors. Licensee MDPI, Basel, Switzerland.

Keywords

Caputo’s fractional derivative
Fractional telegraph equa-tion
Matrix norm
Modified group iterative method
Standard and rotated schemes

ASJC Scopus subject areas

Computer Science (miscellaneous)
Chemistry (miscellaneous)
General Mathematics
Physics and Astronomy (miscellaneous)

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Cite this

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title = "On unconditionally stable new modified fractional group iterative scheme for the solution of 2d time-fractional telegraph model",

abstract = "In this study, a new modified group iterative scheme for solving the two-dimensional (2D) fractional hyperbolic telegraph differential equation with Dirichlet boundary conditions is obtained from the 2h-spaced standard and rotated Crank–Nicolson FD approximations. The findings of new four-point modified explicit group relaxation method demonstrates the rapid rate of convergence of proposed method as compared to the existing schemes. Numerical tests are performed to test the capability of the group iterative scheme in comparison with the point iterative scheme counter-parts. The stability of the derived modified group method is proven by the matrix norm algorithm. The obtained results are tabulated and concluded that exact solutions are exactly symmetric with approximate solutions.",

keywords = "Caputo{\textquoteright}s fractional derivative, Fractional telegraph equa-tion, Matrix norm, Modified group iterative method, Standard and rotated schemes",

author = "Ajmal Ali and Thabet Abdeljawad and Azhar Iqbal and Tayyaba Akram and Muhammad Abbas",

note = "Publisher Copyright: {\textcopyright} 2021 by the authors. Licensee MDPI, Basel, Switzerland.",

year = "2021",

month = nov,

doi = "10.3390/sym13112078",

language = "English",

volume = "13",

journal = "Symmetry",

issn = "2073-8994",

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T1 - On unconditionally stable new modified fractional group iterative scheme for the solution of 2d time-fractional telegraph model

AU - Ali, Ajmal

AU - Abdeljawad, Thabet

AU - Iqbal, Azhar

AU - Akram, Tayyaba

AU - Abbas, Muhammad

PY - 2021/11

Y1 - 2021/11

N2 - In this study, a new modified group iterative scheme for solving the two-dimensional (2D) fractional hyperbolic telegraph differential equation with Dirichlet boundary conditions is obtained from the 2h-spaced standard and rotated Crank–Nicolson FD approximations. The findings of new four-point modified explicit group relaxation method demonstrates the rapid rate of convergence of proposed method as compared to the existing schemes. Numerical tests are performed to test the capability of the group iterative scheme in comparison with the point iterative scheme counter-parts. The stability of the derived modified group method is proven by the matrix norm algorithm. The obtained results are tabulated and concluded that exact solutions are exactly symmetric with approximate solutions.

AB - In this study, a new modified group iterative scheme for solving the two-dimensional (2D) fractional hyperbolic telegraph differential equation with Dirichlet boundary conditions is obtained from the 2h-spaced standard and rotated Crank–Nicolson FD approximations. The findings of new four-point modified explicit group relaxation method demonstrates the rapid rate of convergence of proposed method as compared to the existing schemes. Numerical tests are performed to test the capability of the group iterative scheme in comparison with the point iterative scheme counter-parts. The stability of the derived modified group method is proven by the matrix norm algorithm. The obtained results are tabulated and concluded that exact solutions are exactly symmetric with approximate solutions.

KW - Caputo’s fractional derivative

KW - Fractional telegraph equa-tion

KW - Matrix norm

KW - Modified group iterative method

KW - Standard and rotated schemes

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DO - 10.3390/sym13112078

M3 - Article

AN - SCOPUS:85118917756

SN - 2073-8994

VL - 13

JO - Symmetry

JF - Symmetry

IS - 11

M1 - 2078

ER -

On unconditionally stable new modified fractional group iterative scheme for the solution of 2d time-fractional telegraph model

Abstract

Bibliographical note

Keywords

ASJC Scopus subject areas

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