Exact controllability to the ground state solution for evolution equations of parabolic type via bilinear control

Abstract

In a separable Hilbert space X, we study the linear evolution equation equation* u'(t)+Au(t)+p(t)Bu(t)=0, equation* where A is an accretive self-adjoint linear operator, B is a bounded linear operator on X, and p∈ L2loc(0,+∞) is a bilinear control. We give sufficient conditions in order for the above control system to be locally controllable to the ground state solution, that is, the solution of the free equation (p0) starting from the ground state of A. We also derive global controllability results in large time and discuss applications to parabolic equations in low space dimension.