Simulataneous Control of Wave Systems

Abstract

In this paper, we study the simultaneous controllability of wave systems in an open domain of R d , d ∈ N *. We obtain a partial controllability result on a co-finite dimensional space for wave equations coupled by a single control function. We use microlocal defect measures and the unique continuation property of eigenfunctions to prove that an appropriate observability inequality holds for wave equations with space varying and different speeds coupled by a single control function. For the unique continuation property of eigenfunctions, we construct a counterexample to show that in some metrics, the unique continuation property does not hold. Moreover, we study different conditions to ensure the unique continuation property. We also extend our result to the case of constant coefficients and possibly multiple control functions. In this context, we prove the controllability property is equivalent to an appropriate Kalman rank condition.