Share Your Research, Maximize Your Social Impacts
Soliton solutions of Hirota equation and Hirota-Maccari system
Journal: NEW TRENDS IN MATHEMATICAL SCIENCES (Vol.4, No. 3)Publication Date: 2016-06-01
Authors : Ahmed Arnous;
Page : 231-238
Keywords : Solitons exact solutions trial equation method.;
Source : Download
Find it from : Google Scholar
Abstract
In this paper, the trial equation method is presented to seek the exact solutions of two nonlinear partial differential equations (NLPDEs), namely, the Hirota equation and the Hirota-Maccari system. The obtained solutions are solitary, topological, singular solitons and singular periodic waves. This method is powerful, effective and it can be extended to many NLPDEs.
Other Latest Articles
- Tachibana and Vishnevskii operators applied to X^{V} and X^{H} in almost paracontact structure on tangent bundle T(M)
- The Generalized difference of $\int \chi^{2\textit{I}}$ of fuzzy real numbers over $p-$ metric spaces defined by Musielak Orlicz function
- On generalization of different type inequalities for (α,m)-convex functions via fractional integrals
- Tensor, symmetric and exterior algebras Kahler modules
- On $\bar {G}$-$J$ Anti-invariant Submanifolds of Almost Complex Contact Metric Manifolds
Last modified: 2017-01-26 01:24:50