Group properties and invariant solutions for infinitesimal transformations of a non-linear wave equation

This paper studies the existence and the non-existence of global solutions to the initial boundary value problems for the non-linear wave equation The paper proves that every above-mentioned problem has a unique global solution under rather mild con"ning conditions, and arrives at some su$cient con

## Abstract In this paper we consider the non‐linear wave equation __a,b__>0, associated with initial and Dirichlet boundary conditions. We prove, under suitable conditions on __α,β,m,p__ and for negative initial energy, a global non‐existence theorem. This improves a result by Yang (__Math. Meth

## Abstract We consider the blowup of solutions of the initial boundary value problem for a class of non‐linear evolution equations with non‐linear damping and source terms. By using the energy compensation method, we prove that when __p__>max{__m__, __α__}, where __m__, __α__ and __p__ are non‐neg

We study the global existence, asymptotic behaviour, and global non-existence (blow-up) of solutions for the damped non-linear wave equation of Kirchho! type in the whole space: , and '0, with initial data u(x, 0)"u (x) and u R (x, 0)"u (x).