Hamiltonian Structure, Symmetries and Conservation Laws for a Generalized (2 + 1)-Dimensional Double Dispersion Equation

Elena Recio; Tamara  M. Garrido; Rafael de la Rosa; María  S. Bruzón

doi:10.3390/sym11081031

Symmetry (Aug 2019)

Hamiltonian Structure, Symmetries and Conservation Laws for a Generalized (2 + 1)-Dimensional Double Dispersion Equation

Elena Recio,
Tamara M. Garrido,
Rafael de la Rosa,
María S. Bruzón

Affiliations

Elena Recio: Department of Mathematics, Universidad de Cádiz, Puerto Real, 11510 Cádiz, Spain
Tamara M. Garrido: Department of Mathematics, Universidad de Cádiz, Puerto Real, 11510 Cádiz, Spain
Rafael de la Rosa: Department of Mathematics, Universidad de Cádiz, Puerto Real, 11510 Cádiz, Spain
María S. Bruzón: Department of Mathematics, Universidad de Cádiz, Puerto Real, 11510 Cádiz, Spain

DOI: https://doi.org/10.3390/sym11081031
Journal volume & issue: Vol. 11, no. 8
p. 1031

Abstract

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This paper considers a generalized double dispersion equation depending on a nonlinear function f ( u ) and four arbitrary parameters. This equation describes nonlinear dispersive waves in 2 + 1 dimensions and admits a Lagrangian formulation when it is expressed in terms of a potential variable. In this case, the associated Hamiltonian structure is obtained. We classify all of the Lie symmetries (point and contact) and present the corresponding symmetry transformation groups. Finally, we derive the conservation laws from those symmetries that are variational, and we discuss the physical meaning of the corresponding conserved quantities.

Published in Symmetry

ISSN: 2073-8994 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Mathematics
Website: http://www.mdpi.com/journal/symmetry/

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