Observability for Non-autonomous Systems

Abstract

We study non-autonomous observation systems align* x(t) = A(t) x(t), y(t) = C(t) x(t), x(0) = x0∈ X, align* where (A(t)) is a strongly measurable family of closed operators on a Banach space X and (C(t)) is a family of bounded observation operators from X to a Banach space Y. Based on an abstract uncertainty principle and a dissipation estimate, we prove that the observation system satisfies a final-state observability estimate in Lr(E; Y) for measurable subsets E ⊂eq [0,T], T > 0. We present applications of the above result to families (A(t)) of uniformly strongly elliptic differential operators as well as non-autonomous Ornstein-Uhlenbeck operators P(t) on Lp(Rd) with observation operators C(t)u = u|(t). In the setting of non-autonomous strongly elliptic operators, we derive necessary and sufficient geometric conditions on the family of sets ((t)) such that the corresponding observation system satisfies a final-state observability estimate.