On the Simplicity of Eigenvalues of Two Nonhomogeneous Euler-Bernoulli Beams Connected by a Point Mass

Abstract

In this paper we consider a linear system modeling the vibrations of two nonhomogeneous Euler-Bernoulli beams connected by a point mass. This system is generated by the following equations &&(x)ytt(t,x)+(σ(x)yxx(t,x))xx-(q(x)yx(t,x))x=0,~t>0,~x ∈ (-1,0)(0,1), &&M ytt(t,0)=\(Ty(t,x)\)_x=0--\(Ty(t,x)\)_x=0+,~~t>0, with hinged boundary conditions at both ends, where Ty = ((x)yxx)x - q(x)yx. We prove that all the associated eigenvalues \(n\)n≥1 are algebraically simple, furthermore the corresponding eigenfunctions \(φn\)n≥1 satisfy φn'Tφn(-1)>0 and φn'Tφn(1)<0 for all n≥1. These results give a key to the solutions of various control and stability problems related to this system.