Boundary null-controllability of two coupled parabolic equations : simultaneous condensation of eigenvalues and eigenfunctions

Abstract

Let the matrix operator L = D∂xx + q(x)A0, with D = diag(1, ), ≠ 1, q ∈ L∞ (0, π), and A0 is a Jordan block of order 1. We analyze the boundary null controllability for system yt - Ly = 0. When Q *+ and q(x) = 1, x ∈ (0, π), there exists a family of root vectors of (L * , D(L *)) forming a Riesz basis, moreover, F. Ammar Khodja, A.Benabdallah, M.Gonzalez-Burgos, L.Teresa, show the existence of a minimal time of control depending on condensation of eigenvalues of (L* , D(L*)). But there exists q ∈ L∞ (0, π) such that the family of eigenfunctions of (L* , D(L*)) is complete but it is not a Riesz basis. In this framework new phenomena arise : simultaneous condensation of eigenvalues and eigenfunctions. We prove the existence of a minimal time T0 ∈ [0, +∞] depending on the condensation of eigenvalues and associated eigenfunctions of (L* , D(L*)), such that the corresponding system is null controllable at any time T > T0 and is not if T < T0.