Exact controllability and stabilization for linear dispersive PDE's on the two-dimensional torus

Abstract

The moment method is used to prove the exact controllability of a wide class of bidimensional linear dispersive PDE's posed on the two-dimensional torus T2. The control function is considered to be acting on a small vertical and horizontal strip of the torus. Our results apply to several well-known models including some bidimesional extensions of the Benajamin-Ono and Korteweg-de Vries equations. As a by product, the exponential stabilizability with any given decay rate is also established in Hsp(T2), with s≥ 0, by constructing an appropriated feedback control law.