Sturm-Liouville problems with transfer condition Herglotz dependent on the eigenparameter -- Hilbert space formulation

Abstract

We consider a Sturm-Liouville equation y:=-y'' + qy = λ y on the intervals (-a,0) and (0,b) with a,b>0 and q ∈ L2(-a,b). We impose boundary conditions y(-a)α = y'(-a)α, y(b)β = y'(b)β, where α ∈ [0,π) and β ∈ (0,π], together with transmission conditions rationally-dependent on the eigenparameter via align* -y(0+)(λ η --Σi=1N bi2λ -ci) &= y'(0+) - y'(0-),\\ y'(0-)(λ +ζ-Σj=1Maj2λ -dj) &= y(0+) - y(0-), align* with bi, aj>0 for i=1,…,N, and j=1,…,M. Here we take η, 0 and N,M∈ 0. The geometric multiplicity of the eigenvalues is considered and the cases in which the multiplicity can be 2 are characterized. An example is given to illustrate the cases. A Hilbert space formulation of the above eigenvalue problem as a self-adjoint operator eigenvalue problem in L2(-a,b) N* M*, for suitable N*,M*, is given. The Green's function and the resolvent of the related Hilbert space operator are expressed explicitly.