On multi-dimensional partial differential equations with power nonlinearities in first derivatives
DOI:
https://doi.org/10.13108/2017-9-1-98Keywords:
partial differential equation, reduced equation, method of separation of variables, power nonlinearity.Abstract
We consider a class of multi-dimensional partial differential equations involving a linear differential operator of arbitrary order and a power nonlinearity in the first derivatives. Under some additional assumptions for this operator, we study the solutions of multi-dimensional travelling waves that depend on some linear combinations of the original variables. The original equation is transformed to a reduced one, which can be solved by the separation of variables. Solutions of the reduced equation are found for the cases of additive, multiplicative and combined separation of variables.Downloads
Published
20.03.2017
Issue
Section
Article
