Observability and null-controllability for parabolic equations in Lp-spaces

Abstract

We study (approximate) null-controllability of parabolic equations in Lp(Rd) and provide explicit bounds on the control cost. In particular we consider systems of the form x(t) = -Ap x(t) + 1E u(t), x(0) = x0∈ Lp (Rd), with interior control on a so-called thick set E ⊂ Rd, where p∈ [1,∞), and where A is an elliptic operator of order m ∈ N in Lp(Rd). We prove null-controllability of this system via duality and a sufficient condition for observability. This condition is given by an uncertainty principle and a dissipation estimate. Our result unifies and generalizes earlier results obtained in the context of Hilbert and Banach spaces. In particular, our result applies to the case p=1.