Boundary null controllability for a heat equation with general dynamical boundary condition

Abstract

Let ⊂ RN be a bounded open set with Lipschitz continuous boundary . Let γ>0, δ 0 be real numbers and β a nonnegative measurable function in L∞(). Using some suitable Carleman estimates, we show that the linear heat equation ∂tu - γ u = 0 in ×(0,T) with the non-homogeneous general dynamic boundary conditions ∂tu -δ u+ γ∂u + β u = g on ×(0,T) is always null controllable from the boundary for every T>0 and initial data (u0,u,0)∈ L2()× L2().