A note on the boundary stabilization of a compactly coupled system of wave equations

We prove the well-posedness and study the strong asymptotic stability of a compactly coupled system of wave equations with a nonlinear feedback acting on one end only.

This note establishes the blow up estimates near the blow up time for a system of heat equations coupled in the boundary conditions. Under certain assumptions, the exact rate of blow up is established. We also prove that the only solution with vanishing initial values when pq G 1 is the trivial one.

We consider two problems in boundary controllability of coupled wave/Kircho systems. Let be a bounded region in R n , n ¿ 2, with Lipschitz continuous boundary . In the motivating structural acoustics application, represents an acoustic cavity. Let 0 be a at subset of which represents a exible wall

## Abstract We study numerical approximations of solutions of the following system of heat equations, coupled at the boundary through a nonlinear flux: where __p__ and __q__ are parameters. We prove that the solutions of a semidiscretization in space quench in finite time. Moreover, we describe i