Jorge Ferreira¹ and Ducival Carvalho Pereira²

Copyright © 1992 Jorge Ferreira and Ducival Carvalho Pereira. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

Abstract

In this paper we consider the nonlinear degenerate evolution equation with strong damping,(*)      {K(x,t)utt−Δu−Δut+F(u)=0   in   Q=Ω×]0,T[u(x,0)=u0,   (ku′)(x,0)=0   in   Ωu(x,t)=0           on   ∑=Γ×]0,T[where K is a function with K(x,t)≥0, K(x,0)=0 and F is a continuous real function satisfying(**)     sF(s)≥0,   for   all   s∈R,             Ω is a bounded domain of Rn, with smooth boundary Γ. We prove the existence of a global weak solution for (*).