Regular propagators of bilinear quantum systems

Abstract

The present analysis deals with the regularity of solutions of bilinear control systems of the type x'=(A+u(t)B)xwhere the state x belongs to some complex infinite dimensional Hilbert space, the (possibly unbounded) linear operators A and B are skew-adjoint and the control u is a real valued function. Such systems arise, for instance, in quantum control with the bilinear Schr\"odinger equation. For the sake of the regularity analysis, we consider a more general framework where A and B are generators of contraction semi-groups.Under some hypotheses on the commutator of the operators A and B, it is possible to extend the definition of solution for controls in the set of Radon measures to obtain precise a priori energy estimates on the solutions, leading to a natural extension of the celebrated noncontrollability result of Ball, Marsden, and Slemrod in 1982. Complementary material to this analysis can be found in [hal-01537743v1]