Generalization of B.M. Levitan and M.G. Gasymov's solvability theorems to the case of indecomposable boundary conditions (Q1761003)

The paper deals with the inverse spectral problem for the Sturm-Liouville equation on a finite interval in the case of non-separable boundary conditions. Three problems with different (but related) boundary conditions are considered simultaneously. It is stated that the spectra of two of them plus two eigenvalues of the third problem uniquely determine the potential and the boundary conditions provided these eigenvalues are such that a certain nonlinear equation (with respect to the boundary parameters) has a solution. Moreover, the authors present a characterization of the data for the inverse problem. This characterization involves the asymptotics of both spectra and the above-mentioned solvability condition.