Inverse problems for Dirac operators with a constant delay less than half of the interval

TL;DR

This paper investigates inverse spectral problems for Dirac operators with a specific constant delay, providing uniqueness, solvability conditions, reconstruction algorithms, and stability analysis.

Contribution

It introduces a comprehensive study of inverse spectral problems for Dirac operators with delays between two-fifths and half of the interval, including new solvability and stability results.

Findings

Established uniqueness of solutions for the inverse problems.

Derived necessary and sufficient conditions for solvability.

Developed a reconstruction algorithm and analyzed stability.

Abstract

In this work, we consider Dirac-type operators with a constant delay less than half of the interval and not less than two-fifths of the interval. For our considered Dirac-type operators, two inverse spectral problems are studied. Specifically, reconstruction of two complex $L_{2}$-potentials is studied from complete spectra of two boundary value problems with one common Dirichlet boundary condition and Neumann boundary condition, respectively. We give answers to the full range of questions usually raised in the inverse spectral theory. That is, we give uniqueness, necessary and sufficient conditions of the solvability, reconstruction algorithm and uniform stability for our considered inverse problems.