Department of Mathematics
University of Laghouat, Algeria
email: nawelabedess@gmail.com
Department of Mathematics
University of Batna II, Algeria
email: k.melkemi@univ-batna2.dz
Abdesselam Nawel, Khaled Melkemi
Abstract:
First we consider the boundary stabilization of Schrodinger
equations with constant coefficient memory feedback.
This is done by using Riemannian geometry methods and the
multipliers technique.
Then we explore the stabilization limits of Schrodinger equations
whose elliptical part has a variable coefficient. We established
the exponential decay of solutions using the multipliers techniques.
The introduction of dissipative boundary conditions of memory type allowed
us to obtain an accurate estimate on the uniform rate of decay of the energy
for Schrodinger equations.
Submitted February 20, 2017. Published May 11, 2017.
Math Subject Classifications: 93D15, 35J10, 35B40, 53C17.
Key Words: Schrodinger equation; exponential stabilization;
boundary condition of memory type; Riemannian geometry.
Show me the PDF file (227 KB), TEX file for this article.
|
Abdesselam Nawel Department of Mathematics University of Laghouat, Algeria email: nawelabedess@gmail.com |
|---|---|
| Khaled Melkemi Department of Mathematics University of Batna II, Algeria email: k.melkemi@univ-batna2.dz |
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