Exact controllability for a degenerate and singular wave equation with moving boundary

Abstract: <p style='text-indent:20px;'>This paper is concerned with the exact boundary controllability for a degenerate and singular wave equation in a bounded interval with a moving endpoint. By the multiplier method and using an adapted Hardy-poincaré inequality, we prove direct and inverse inequalities for the solutions of the associated adjoint equation. As a consequence, by the Hilbert Uniqueness Method, we deduce the controllability result of the considered system when the control acts on the moving boundary… Show more

“…Recently, several controllability results have also been obtained for scalar degenerate equations, see for example [24,25,26,27,28,29,30,31,32,33]. However, in the more complex situation of coupled degenerate hyperbolic equations, not many things are known.…”

Indirect Boundary Controllability of Coupled Degenerate Wave Equations

“…Recently, several controllability results have also been obtained for scalar degenerate equations, see for example [24,25,26,27,28,29,30,31,32,33]. However, in the more complex situation of coupled degenerate hyperbolic equations, not many things are known.…”

Indirect Boundary Controllability of Coupled Degenerate Wave Equations

Stabilization for degenerate equations with drift and small singular term

Stability for degenerate wave equations with drift under simultaneous degenerate damping