The Borg-Marchenko uniqueness theorem for complex potentials

Abstract

We introduce and study a new theoretical concept of spectral pair for a Schr\"odinger operator H in L2(R+) with a bounded complex-valued potential. The spectral pair consists of a scalar measure and a complex-valued function. We show that in many ways, the spectral pair generalises the classical spectral measure to the non-self-adjoint case. First, extending the classical Borg-Marchenko theorem, we prove a uniqueness result: the spectral pair uniquely determines the operator H. Second, we derive asymptotic formulas for the spectral pair in the spirit of the classical result of Marchenko. In the case of real-valued potentials, we relate the spectral pair to the spectral measure of H. Lastly, we provide formulas for the spectral pair at a~simple eigenvalue of~|H|.

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