Symmetry reductions and new functional separable solutions of nonlinear Klein–Gordon and telegraph type equations

DOI

10.1080/14029251.2020.1700633How to use a DOI?

Keywords

nonlinear Klein–Gordon equations; nonlinear telegraph equations; symmetry reductions; functional separable solutions; generalized traveling wave solutions; delay differential equations

Abstract

The paper is concerned with different classes of nonlinear Klein–Gordon and telegraph type equations with variable coefficients

c(x)utt+d(x)ut=[a(x)ux]x+b(x)ux+p(x)f(u),

where f(u) is an arbitrary function. We seek exact solutions to these equations by the direct method of symmetry reductions using the composition of functions u = U(z) with z = φ(x,t). We show that f(u) and any four of the five functional coefficients a(x), b(x), c(x), d(x), and p(x) in such equations can be set arbitrarily, while the remaining coefficient can be expressed in terms of the others. The study investigates the properties and finds some solutions of the overdetermined system of PDEs for φ(x,t). Examples of specific equations with new exact functional separable solutions are given. In addition, the study presents some generalized traveling wave solutions to more complex, nonlinear Klein–Gordon and telegraph type equations with delay.

Copyright

© 2020 The Authors. Published by Atlantis and Taylor & Francis

Open Access

This is an open access article distributed under the CC BY-NC 4.0 license (http://creativecommons.org/licenses/by-nc/4.0/).

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TY  - JOUR
AU  - Alexei I. Zhurov
AU  - Andrei D. Polyanin
PY  - 2020
DA  - 2020/01/27
TI  - Symmetry reductions and new functional separable solutions of nonlinear Klein–Gordon and telegraph type equations
JO  - Journal of Nonlinear Mathematical Physics
SP  - 227
EP  - 242
VL  - 27
IS  - 2
SN  - 1776-0852
UR  - https://doi.org/10.1080/14029251.2020.1700633
DO  - 10.1080/14029251.2020.1700633
ID  - Zhurov2020
ER  -