Exact Boundary Controllability for the Boussinesq Equation with Variable Coefficients

Abstract

In this paper we study the exact boundary controllability for the following Boussinesq equation with variable physical parameters: arraylll (x)ytt=-(σ(x)yxx)xx+(q(x)yx)x-(y2)xx,&&t>0,~x∈(0,l),\\ y(t,0)=σ(l)yxx(t,0)=y(t,l)=0,~~σ(l)yxx(t,l)=u(t)&&t>0, array where l>0, the coefficients (x)>0,σ(x)>0 , q(x)≥0 in [0,l] and u is the control acting at the end x=l. We prove that the linearized problem is exactly controllable in any time T>0. Our approach is essentially based on a detailed spectral analysis together with the moment method. Furthermore, we establish the local exact controllability for the nonlinear problem by fixed point argument.