Borg-type theorems for generalized Jacobi matrices (Q2387882)

Inverse problems of generalized Jacobi matrices associated with the sequence of real polynomials are studied. A formula for the trace of the generalized Jacobi matrix is given in explicit form. Then, two types of inverse problems are considered. The first type of the inverse problem, the so called Borg-type problem, concerns the unique reconstruction of the generalized Jacobi matrix \(H\) and its parameter \(\tau\) from two different spectra \(\sigma(H)\) and \(\sigma(H(\tau))\). The second type of the inverse problem is solved by the theorem on the uniqueness of the reconstruction of a generalized Jacobi matrix from mixed data, which represents an analog of the Hochstadt-Lieberman theorem for classical Jacobi matrices.