Email this article Conservation Laws, Symmetries, and Line Soliton Solutions of Generalized KP and Boussinesq Equations with p-Power Nonlinearities in Two Dimensions
- Authors: Anco S.C.1, Gandarias M.L.2, Recio E.2
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Affiliations:
- Brock University
- Cadiz University
- Issue: Vol 197, No 1 (2018)
- Pages: 1393-1411
- Section: Article
- URL: https://journals.rcsi.science/0040-5779/article/view/171939
- DOI: https://doi.org/10.1134/S004057791810001X
- ID: 171939
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Abstract
Nonlinear generalizations of integrable equations in one dimension, such as the Korteweg–de Vries and Boussinesq equations with p-power nonlinearities, arise in many physical applications and are interesting from the analytic standpoint because of their critical behavior. We study analogous nonlinear p-power generalizations of the integrable Kadomtsev–Petviashvili and Boussinesq equations in two dimensions. For all p ≠ 0, we present a Hamiltonian formulation of these two generalized equations. We derive all Lie symmetries including those that exist for special powers p ≠ 0. We use Noether’s theorem to obtain conservation laws arising from the variational Lie symmetries. Finally, we obtain explicit line soliton solutions for all powers p > 0 and discuss some of their properties.
About the authors
S. C. Anco
Brock University
Email: marialuz.gandarias@uca.es
Canada, St. Catharines
M. L. Gandarias
Cadiz University
Author for correspondence.
Email: marialuz.gandarias@uca.es
Spain, Cadiz
E. Recio
Cadiz University
Email: marialuz.gandarias@uca.es
Spain, Cadiz
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