Analytic solutions of the generalized water wave dynamical equations based on time-space symmetric differential operator
Document Type
Article
Publication Date
6-1-2020
Abstract
It is well known that there is a deep connection between the symmetric and traveling wave solutions. It has been shown that all symmetric waves are traveling waves. In this paper, we establish new analytic solution collections of nonlinear conformable time-fractional water wave dynamical equation in a complex domain. For this purpose, we construct a new definition of a symmetric conformable differential operator (SCDO). The operator has a symmetric representation in the open unit disk. By using SCDO, we generalize a class of water wave dynamical equation type time-space fractional complex Ginzburg-Landau equation. The results show that the obtainable approaches are powerful, dependable and prepared to apply to all classes of complex differential equations. (C) 2020 Published by Elsevier B.V. on behalf of Shanghai Jiaotong University.
Keywords
Analytic solution, Conformable calculus, Fractional calculus, Water wave equations, Majorization, Subordination and superordination
Divisions
fsktm
Funders
University Ajman [2019-IRG-HBS-11]
Publication Title
Journal of Ocean Engineering and Science
Volume
5
Issue
2
Publisher
Elsevier
Publisher Location
RADARWEG 29, 1043 NX AMSTERDAM, NETHERLANDS