On a class of integral systems

Abstract

We study spectral problems for two--dimensional integral system with two given non-decreasing functions R1, R2 on an interval [0,b) which is a generalization of the Krein string. Associated to this system are the maximal linear relation T and the minimal linear relation T in the space L2(R2) which are connected by T=T*. It is shown that the limit point condition at b for this system is equivalent to the strong limit point condition for the linear relation T. In the limit circle case the strong limit point condition fails to hold on T but it is still satisfied on a subspace TN* of T characterized by the Neumann boundary condition at b. The notion of the principal Titchmarsh-Weyl coefficient of this integral system is introduced both in the limit point case and in the limit circle case. Boundary triples for the linear relation T in the limit point case (and for TN* in the limit circle case) are constructed and it is shown that the corresponding Weyl function coincides with the principal Titchmarsh-Weyl coefficient of the integral system. The notion of the dual integral system is introduced by reversing the order of R1 and R2. It is shown that the principal Titchmarsh-Weyl coefficients q and q of the direct and the dual integral systems are related by the equality λ q(λ) = -1/q(λ) both in the regular and the singular case.