Boundary Controllability Of Two Vibrating Strings Connected By A Point Mass With Variable Coefficients

Abstract

S. Hansen and E. Zuazua [SIAM J. Cont. Optim., 1995] studied the problem of exact controllability of two strings connected by a point mass with constant physical coefficients. In this paper we study the same problem with variable physical coefficients. This system is generated by the following equations (x) utt=(σ(x) ux)x-q(x)u,~~~~x∈ (-1,0) (0,1),~t>0, Mutt(0,t)+σ1(0)ux(0-,t)-σ2(0)ux(0+,t)=0,~~~t>0, with Dirichlet boundary condition on the left end and a control acts on the right end. We prove that this system is exactly controllable in an asymmetric space for the control time T> 2∫-11((x)σ(x))12dx. We establish the equivalence between a suitable asymmetric norm of the initial data and the L2(0,T)-norm of ux(1,t). Our approach is mainly based on a detailed spectral analysis and the theory of divided differences. More precisely, we prove that the spectral gap tends to zero with a precise asymptotic estimate.