On null-controllability of the heat equation on infinite strips and control cost estimate

Abstract

We consider an infinite strip L=(0,2π L)d-1×R, d≥ 2, L>0, and study the control problem of the heat equation on L with Dirichlet or Neumann boundary conditions, and control set ω⊂L. We provide a sufficient and necessary condition for null-controllability in any positive time T>0, which is a geometric condition on the control set ω. This is referred to as "thickness with respect to L" and implies that the set ω cannot be concentrated in a particular region of L. We compare the thickness condition with a previously known necessity condition for null-controllability and give a control cost estimate which only shows dependence on the geometric parameters of ω and the time T.