A novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional order
Abstract We investigate some solitary wave results of time fractional evolution equations. By employing the extended rational exp ( ( − ψ ′ ψ ) ( η ) ) $\exp ( (-\frac{{\psi }^{\prime }}{\psi }) ( \eta ) )$ -expansion method, a few different results including kink, singular-kink, multiple soliton, a...
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SpringerOpen
2020-06-01
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| Series: | Advances in Difference Equations |
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| Online Access: | http://link.springer.com/article/10.1186/s13662-020-02751-5 |
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doaj-50f2b8775877413db16d5bc918f6aa882020-11-25T03:12:35ZengSpringerOpenAdvances in Difference Equations1687-18472020-06-012020111510.1186/s13662-020-02751-5A novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional orderAbdul Ghaffar0Ayyaz Ali1Sarfaraz Ahmed2Saima Akram3Moin-ud-Din Junjua4Dumitru Baleanu5Kottakkaran Sooppy Nisar6Informetrics Research Group, Ton Duc Thang UniversityDepartment of Mathematics and Statistics, Faculty of Social Sciences, Institute of Southern PunjabDepartment of Mathematics, Faculty of Sciences, Government, College University FaisalabadCentre for Advanced Studies in Pure and Applied Mathematics, Bahauddin Zakariya UniversityDepartment of Mathematics and Statistics, Faculty of Social Sciences, Institute of Southern PunjabDepartment of Mathematics, Cankaya UniversityDepartment of Mathematics, College of Arts and Science, Prince Sattam bin Abdulaziz UniversityAbstract We investigate some solitary wave results of time fractional evolution equations. By employing the extended rational exp ( ( − ψ ′ ψ ) ( η ) ) $\exp ( (-\frac{{\psi }^{\prime }}{\psi }) ( \eta ) )$ -expansion method, a few different results including kink, singular-kink, multiple soliton, and periodic wave solutions are formally generated. It is worth mentioning that the solutions obtained are more general with more parameters. The exact solutions are constructed in the form of exponential, trigonometric, rational, and hyperbolic functions. With the choice of proper values of parameters, graphs to some of the obtained solutions are drawn. On comparing some special cases, our solutions are in good agreement with the results published previously and the remaining are new.http://link.springer.com/article/10.1186/s13662-020-02751-5Simplified modified Camassa–Holm (SMCH) equationFractional calculusCaputo’s derivative of fractional orderSolitary wave solutionsExtended rational exp ( ( ψ ′ ψ ) ( η ) ) $\exp ((\frac{\psi '}{\psi })(\eta ))$ -expansion method |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Abdul Ghaffar Ayyaz Ali Sarfaraz Ahmed Saima Akram Moin-ud-Din Junjua Dumitru Baleanu Kottakkaran Sooppy Nisar |
| spellingShingle |
Abdul Ghaffar Ayyaz Ali Sarfaraz Ahmed Saima Akram Moin-ud-Din Junjua Dumitru Baleanu Kottakkaran Sooppy Nisar A novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional order Advances in Difference Equations Simplified modified Camassa–Holm (SMCH) equation Fractional calculus Caputo’s derivative of fractional order Solitary wave solutions Extended rational exp ( ( ψ ′ ψ ) ( η ) ) $\exp ((\frac{\psi '}{\psi })(\eta ))$ -expansion method |
| author_facet |
Abdul Ghaffar Ayyaz Ali Sarfaraz Ahmed Saima Akram Moin-ud-Din Junjua Dumitru Baleanu Kottakkaran Sooppy Nisar |
| author_sort |
Abdul Ghaffar |
| title |
A novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional order |
| title_short |
A novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional order |
| title_full |
A novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional order |
| title_fullStr |
A novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional order |
| title_full_unstemmed |
A novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional order |
| title_sort |
novel analytical technique to obtain the solitary solutions for nonlinear evolution equation of fractional order |
| publisher |
SpringerOpen |
| series |
Advances in Difference Equations |
| issn |
1687-1847 |
| publishDate |
2020-06-01 |
| description |
Abstract We investigate some solitary wave results of time fractional evolution equations. By employing the extended rational exp ( ( − ψ ′ ψ ) ( η ) ) $\exp ( (-\frac{{\psi }^{\prime }}{\psi }) ( \eta ) )$ -expansion method, a few different results including kink, singular-kink, multiple soliton, and periodic wave solutions are formally generated. It is worth mentioning that the solutions obtained are more general with more parameters. The exact solutions are constructed in the form of exponential, trigonometric, rational, and hyperbolic functions. With the choice of proper values of parameters, graphs to some of the obtained solutions are drawn. On comparing some special cases, our solutions are in good agreement with the results published previously and the remaining are new. |
| topic |
Simplified modified Camassa–Holm (SMCH) equation Fractional calculus Caputo’s derivative of fractional order Solitary wave solutions Extended rational exp ( ( ψ ′ ψ ) ( η ) ) $\exp ((\frac{\psi '}{\psi })(\eta ))$ -expansion method |
| url |
http://link.springer.com/article/10.1186/s13662-020-02751-5 |
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