Blow--up for the wave equation with hyperbolic dynamical boundary conditions, interior and boundary nonlinear damping and sources

Abstract

The aim of this paper is to give global nonexistence and blow--up results for the problem cases utt- u+P(x,ut)=f(x,u) &in (0,∞)×,\\ u=0 &on (0,∞)× 0,\\ utt+∂ u- u+Q(x,ut)=g(x,u) &on (0,∞)× 1,\\ u(0,x)=u0(x), ut(0,x)=u1(x) & in , cases where is a bounded open C1 subset of RN, N 2, =∂, (0,1) is a partition of , 1= being relatively open in , denotes the Laplace--Beltrami operator on , is the outward normal to , and the terms P and Q represent nonlinear damping terms, while f and g are nonlinear source terms. These results complement the analysis of the problem given by the author in two recent papers, dealing with local and global existence, uniqueness and well--posedness.