A collocation technique based on modified form of trigonometric cubic B-spline basis functions for Fisher's reaction-diffusion equation. Issue 5 (20th September 2018)
- Record Type:
- Journal Article
- Title:
- A collocation technique based on modified form of trigonometric cubic B-spline basis functions for Fisher's reaction-diffusion equation. Issue 5 (20th September 2018)
- Main Title:
- A collocation technique based on modified form of trigonometric cubic B-spline basis functions for Fisher's reaction-diffusion equation
- Authors:
- Dhiman, Neeraj
Tamsir, Mohammad - Abstract:
- Abstract : Purpose: The purpose of this paper is to present a modified form of trigonometric cubic B-spline (TCB) collocation method to solve nonlinear Fisher's type equations. Taylor series expansion is used to linearize the nonlinear part of the problem. Five examples are taken for analysis. The obtained results are better than those obtained by some numerical methods as well as exact solutions. It is noted that the modified form of TCB collocation method is an economical and efficient technique to approximate the solution PDEs. The authors also carried out the stability analysis which proves that the method is unconditionally stable. Design/methodology/approach: The authors present a modified form of TCB collocation method to solve nonlinear Fisher's type equations. Taylor series expansion is used to linearize the nonlinear part of the problem. The authors also carried out the stability analysis. Findings: The authors found that the proposed method results are better than those obtained by some numerical methods as well as exact solutions. It is noted that the modified form of TCB collocation method is an economical and efficient technique to approximate the solution PDEs. Originality/value: The authors propose a new method, namely, modified form of TCB collocation method. In the authors' best knowledge, aforesaid method is not proposed by any other author. The authors used this method to solve nonlinear Fisher's type equations and obtained more accurate results than theAbstract : Purpose: The purpose of this paper is to present a modified form of trigonometric cubic B-spline (TCB) collocation method to solve nonlinear Fisher's type equations. Taylor series expansion is used to linearize the nonlinear part of the problem. Five examples are taken for analysis. The obtained results are better than those obtained by some numerical methods as well as exact solutions. It is noted that the modified form of TCB collocation method is an economical and efficient technique to approximate the solution PDEs. The authors also carried out the stability analysis which proves that the method is unconditionally stable. Design/methodology/approach: The authors present a modified form of TCB collocation method to solve nonlinear Fisher's type equations. Taylor series expansion is used to linearize the nonlinear part of the problem. The authors also carried out the stability analysis. Findings: The authors found that the proposed method results are better than those obtained by some numerical methods as well as exact solutions. It is noted that the modified form of TCB collocation method is an economical and efficient technique to approximate the solution PDEs. Originality/value: The authors propose a new method, namely, modified form of TCB collocation method. In the authors' best knowledge, aforesaid method is not proposed by any other author. The authors used this method to solve nonlinear Fisher's type equations and obtained more accurate results than the results obtained by other methods. … (more)
- Is Part Of:
- Multidiscipline modeling in materials and structures. Volume 14:Issue 5(2018)
- Journal:
- Multidiscipline modeling in materials and structures
- Issue:
- Volume 14:Issue 5(2018)
- Issue Display:
- Volume 14, Issue 5 (2018)
- Year:
- 2018
- Volume:
- 14
- Issue:
- 5
- Issue Sort Value:
- 2018-0014-0005-0000
- Page Start:
- 923
- Page End:
- 939
- Publication Date:
- 2018-09-20
- Subjects:
- Fisher's equation -- Modified form of TCB collocation method -- Stability analysis -- Von Neumann method
Materials -- Mathematical models -- Periodicals
Engineering -- Mathematical models -- Periodicals
620.11015118 - Journal URLs:
- http://firstsearch.oclc.org ↗
http://www.emeraldinsight.com/journals.htm?issn=1573-6105 ↗
http://www.ingentaconnect.com/content/vsp/mmms ↗
http://www.swetswise.com/link/access%5Fdb?issn=1573-6105 ↗
http://www.emeraldinsight.com/ ↗ - DOI:
- 10.1108/MMMS-12-2017-0150 ↗
- Languages:
- English
- ISSNs:
- 1573-6105
- Deposit Type:
- Legaldeposit
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- Available online (eLD content is only available in our Reading Rooms) ↗
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