From internal to pointwise control for the 1D heat equation and minimal control time

Abstract

Our goal is to study controllability and observability properties of the 1D heat equation with internal control (or observation) set ω=(x0-, x0+ ), in the limit → 0, where x0∈ (0,1). It is known that depending on arithmetic properties of x0, there may exist a minimal time T0 of pointwise control at x0 of the heat equation. Besides, for any fixed, the heat equation is controllable with control set ω in any time T>0. We relate these two phenomena. We show that the observability constant on ω does not converge to 0 as → 0 at the same speed when T>T0 (in which case it is comparable to 1/2) or T<T0 (in which case it converges faster to 0). We also describe the behavior of optimal L2 null-controls on ω in the limit → 0.