On recovering non-local perturbation of non-selfadjoint Sturm-Liouville operator

Abstract

Recently, there appeared a significant interest in inverse spectral problems for non-local operators arising in numerous applications. In the present work, we consider the operator with frozen argument ly = -y''(x) + p(x)y(x) + q(x)y(a), which is a non-local perturbation of the non-selfadjoint Sturm--Liouville operator. We study the inverse problem of recovering the potential q∈ L2(0, π) by the spectrum when the coefficient p∈ L2(0, π) is known. While the previous works were focused only on the case p=0, here we investigate the more difficult non-selfadjoint case, which requires consideration of eigenvalues multiplicities. We develop an approach based on the relation between the characteristic function and the coefficients \ n\n 1 of the potential q by a certain basis. We obtain necessary and sufficient conditions on the spectrum being asymptotic formulae of a special form. They yield that a part of the spectrum does not depend on q, i.e. it is uninformative. For the unique solvability of the inverse problem, one should supplement the spectrum with a part of the coefficients n, being the minimal additional data. For the inverse problem by the spectrum and the additional data, we obtain a uniqueness theorem and an algorithm.