Control of the Cauchy problem on Hilbert spaces: A global approach via symbol criteria

Abstract

Let A and B be invariant linear operators with respect to a decomposition \Hj\j∈ N of a Hilbert space H in subspaces of finite dimension. We give necessary and sufficient conditions for the controllability of the Cauchy problem ut=Au+Bv,\,\,u(0)=u0, in terms of the (global) matrix-valued symbols σA and σB of A and B, respectively, associated to the decomposition \Hj\j∈ N. Then, we present some applications including the controllability of the Cauchy problem on compact manifolds for elliptic operators and the controllability of fractional diffusion models for H\"ormander sub-Laplacians on compact Lie groups. We also give conditions for the controllibility of wave and Schr\"odinger equations in these settings.