Control From an Interior Hypersurface

Abstract

We consider a compact Riemannian manifold M (possibly with boundary) and ⊂ M ∂ M an interior hypersurface (possibly with boundary). We study observation and control from for both the wave and heat equations. For the wave equation, we prove controllability from in time T under the assumption (TGCC) that all generalized bicharacteristics intersect transversally in the time interval (0,T). For the heat equation we prove unconditional controllability from . As a result, we obtain uniform lower bounds for the Cauchy data of Laplace eigenfunctions on under TGCC and unconditional exponential lower bounds on such Cauchy data.