Department of Mathematics
Izmir Democracy University
Izmir, 35140, Turkey
email: setenay.akduman@idu.edu.tr
Department of Mathematics
Morgan State University
Baltimore, MD 21251, USA
email: alexander.pankov@morgan.edu
Setenay Akduman, Alexander Pankov
Abstract:
The article studies the exponential localization of eigenfunctions associated
with isolated eigenvalues of Schrodinger operators on infinite metric graphs.
We strengthen the result obtained in [3] providing a bound
for the rate of exponential localization in terms of the distance between the
eigenvalue and the essential spectrum. In particular, if the spectrum is
purely discrete, then the eigenfunctions decay super-exponentially.
Submitted July 14, 2018. Published September 10, 2018.
Math Subject Classifications: 34B45, 34L40, 81Q35.
Key Words: Infinite metric graph; Schrodinger operator; eigenfunction;
exponential decay.
Show me the PDF file (231 KB), TEX file for this article.
|
Setenay Akduman Department of Mathematics Izmir Democracy University Izmir, 35140, Turkey email: setenay.akduman@idu.edu.tr |
|---|---|
|
Alexander Pankov Department of Mathematics Morgan State University Baltimore, MD 21251, USA email: alexander.pankov@morgan.edu |
Return to the EJDE web page