EXACT CONTROLLABILITY FOR THE LAME SYSTEM

In this article, we prove an exact boundary controllability result for the isotropic elastic wave system in a bounded domain Omega of R-3. This result is obtained under a microlocal condition linking the bicharacteristic paths of the system and the region of the boundary on which the control acts. This condition is to be compared with the so-called Geometric Control Condition by Bardos, Lebeau and Rauch [3]. The proof relies on microlocal tools, namely the propagation of the C-infinity wave front and microlocal defect measures.