Sturm-Liouville-type operators with frozen argument and Chebyshev polynomials

Abstract

The paper deals with Sturm-Liouville-type operators with frozen argument of the form y:=-y''(x)+q(x)y(a), y(α)(0)=y(β)(1)=0, where α,β∈\0,1\ and a∈[0,1] is an arbitrary fixed rational number. Such nonlocal operators belong to the so-called loaded differential operators, which often appear in mathematical physics. We focus on the inverse problem of recovering the potential q(x) from the spectrum of the operator . Our goal is two-fold. Firstly, we establish a deep connection between the so-called main equation of this inverse problem and Chebyshev polynomials of the first and the second kinds. This connection gives a new perspective method for solving the inverse problem. In particular, it allows one to completely describe all non-degenerate and degenerate cases, i.e. when the solution of the inverse problem is unique or not, respectively. Secondly, we give a complete and convenient description of iso-spectral potentials in the space of complex-valued integrable functions.

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