Global existence of low regularity solutions of non-linear wave equations

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 We study the initial value problem where $ \|u(\cdot,t)\| = \int \nolimits ^ {\infty} \_ {- \infty}\varphi(x) | u( x,t ) | {\rm{ d }} x$ with φ(__x__)⩾0 and $ \int \nolimits^{\infty} \_ {-\infty} \varphi (x) \, {\rm{d}}x\,= 1$. We show that solutions exist globally for 0<__p__⩽1, while

## Abstract Let Ω be a domain in ℝ^__n__^ and let __m__ϵ ℕ; be given. We study the initial‐boundary value problem for the equation with a homogeneous Dirichlet boundary condition; here __u__ is a scalar function, \documentclass{article}\pagestyle{empty}\begin{document}$ \bar D\_x^m u: = (\partial \

## Abstract The Cauchy problem for semilinear wave equations u~tt~ − Δ__u__ + __h__(|__x__|)__u__^__p__^ = 0 with radially symmetric smooth ‘large’ data has a unique global classical solution in arbitrary space dimensions if __h__ is non‐negative and __p__ any odd integer provided the smooth factor

In this paper, the global existence of solutions to the initial boundary value problem for a class of quasi-linear wave equations with viscous damping and source terms is studied by using a combination of Galerkin approximations, compactness, and monotonicity methods.

## 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