Decay properties of solutions of some quasilinear hyperbolic equations with strong damping

We consider the asymptotic behavior of the solution of quasilinear hyperbolic equation with linear damping subsequent to [K. Nishihara, J. Differential Equations 131 (1996), 171 188]. In that article, the system with damping v t &u x =0, u t +p(v) x = &:u, p$(v)<0(v>0) was treated, and the converge

In this work, the nonexistence of the global solutions to initial boundary value problems with dissipative terms in the boundary conditions is considered for a class of quasilinear hyperbolic equations. The nonexistence proof is achieved by the usage of the so-called concavity method. In this method

## Abstract In this paper, we consider the non‐linear wave equation __a__,__b__>0, associated with initial and Dirichlet boundary conditions. Under suitable conditions on __α__, __m__, and __p__, we give precise decay rates for the solution. In particular, we show that for __m__=0, the decay is ex

In this paper the non-existence of global solutions of two fourth-order hyperbolic equations with dynamic boundary conditions is considered. The method of proof makes use of the generalized convexity method due to LADYZHENSKAYA and KALANTAROV [4].