Null-Controllability of a Non-Local Heat Equation

Abstract

We consider the null-controllability of a non-local heat equation by interior L2() controls. We confirm a conjecture of Lissy and Zuazua by showing that it is enough to assume that the kernel k(x,) is symmetric and k(x,)∈ L2(×) in order to obtain the result. The result is obtained by treating the non-local linear operator K:L2()→ L2() as a compact and bounded perturbation of the Dirichlet-Laplacian, A, which leads to useful bounds on the semigroup generated by (A+K,D(A)). Using this approach, we are also able to estimate the cost of control.