Ambarzumyan theorem by zeros of eigenfunction

In this short paper, we give the proof of the Ambarzumyan theorem by zeros of eigenfunctions (nodal points) different from eigenvalues for the one-dimensional p-Laplacian eigenvalue problem. We show that the potential function q(x) is zero if the spectrum is in the specific form. We consider this theorem for p-Laplacian equation with periodic and anti-periodic cases. If p = 0, results are coincided with the results given for Sturm-Liouvile problem.

Language:: English

Publication timeframe:: 2 times per year
Journal Subjects:: Computer Sciences, Computer Sciences, other, Engineering, Introductions and Overviews, Engineering, other, Mathematics, General Mathematics, Physics, Physics, other

Journal RSS Feed

Ambarzumyan theorem by zeros of eigenfunction

Beyhan Kemaloglu

Published Online: Sep 13, 2023

Page range: 211 - 216

Received: Jun 20, 2023

Accepted: Aug 10, 2023

DOI: https://doi.org/10.2478/ijmce-2023-0017

KeywordsAmbarzumyan theorem, -Laplacian, spectrum

© 2023 Beyhan Kemaloglu, published by Sciendo

This work is licensed under the Creative Commons Attribution 4.0 International License.

Keywords
Ambarzumyan theorem, -Laplacian, spectrum