Título

Traveling wave solutions for wave equations with two exponential nonlinearities

Autor

Stefan C. Mancas

Haret Codratian Rosu

MAXIMINO PEREZ MALDONADO

Nivel de Acceso

En Embargo

Licencia

http://creativecommons.org/licenses/by-nc-nd/4.0

Identificador alterno

doi: https://doi.org/10.1515/zna-2018-0055

Materias

Dodd-Bullough - (AUTOR) Dodd-Bullough-Mikhailov - (AUTOR) Liouville Equation - (AUTOR) sine-Gordon - (AUTOR) sinh-Gordon - (AUTOR) Tzitzéica - (AUTOR) Weierstrass Function - (AUTOR) CIENCIAS FÍSICO MATEMÁTICAS Y CIENCIAS DE LA TIERRA - (CTI) FÍSICA - (CTI) FÍSICA - (CTI)

Resumen o descripción

"We use a simple method that leads to the integrals involved in obtaining the travelling-wave solutions of wave equations with one and two exponential nonlinearities. When the constant term in the integrand is zero, implicit solutions in terms of hypergeometric functions are obtained, while when that term is nonzero, all the basic travelling-wave solutions of Liouville, Tzitzéica, and their variants, as as well sine/sinh-Gordon equations with important applications in the phenomenology of nonlinear physics and dynamical systems are found through a detailed study of the corresponding elliptic equations."

Editor

Walter de Gruyter GmbH

Fecha de publicación

2018

Tipo de publicación

Artículo

Recurso de información

http://ipicyt.repositorioinstitucional.mx/jspui/handle/1010/2013

Formato

application/pdf

Relación

&

Pérez-Maldonado, M. (2018). Travelling-Wave Solutions for Wave Equations with Two Exponential Nonlinearities. Zeitschrift für Naturforschung A, 73(10), pp. 883-892. doi:10.1515/zna-2018-0055

Sugerencia de citación

Mancas, S., Rosu, H.

Repositorio Orígen

Repositorio IPICYT

Descargas

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