On a regularization approach to the inverse transmission eigenvalue problem

TL;DR

This paper investigates the inverse transmission eigenvalue problem for irregular cases, proposing a regularization approach to analyze solvability and stability of recovering the potential function from spectral data.

Contribution

It introduces a regularization method for the irregular transmission eigenvalue problem, establishing local solvability and stability results for potential recovery.

Findings

Proves local solvability of the inverse problem.

Establishes stability of potential recovery from spectral data.

Provides conditions for the solvability of the inverse problem.

Abstract

We consider the irregular (in the Birkhoff and even the Stone sense) transmission eigenvalue problem of the form $-y''+q(x)y=\rho^2 y,$ $y(0)=y(1)\cos\rho a-y'(1)\rho^{-1}\sin\rho a=0.$ The main focus is on the ''most'' irregular case $a=1,$ which is important for applications. The uniqueness questions of recovering the potential $q(x)$ from transmission eigenvalues were studied comprehensively. Here we investigate the solvability and stability of this inverse problem. For this purpose, we suggest the so-called regularization approach, under which there should first be chosen some regular subclass of eigenvalue problems under consideration, which actually determines the course of the study and even the precise statement of the inverse problem. For definiteness, by assuming $q(x)$ to be a complex-valued function in $W_2^1[0,1]$ possessing the zero mean value and $q(1)\ne0,$ we study properties of transmission eigenvalues and prove local solvability and stability of recovering $q(x)$ from the spectrum along with the value $q(1).$ In Appendices, we provide some illustrative examples of regular and irregular transmission eigenvalue problems, and also obtain necessary and sufficient conditions in terms of the characteristic function for solvability of the inverse problem of recovering an arbitrary real-valued square-integrable potential $q(x)$ from the spectrum, for any fixed $a\in{\mathbb R}.$