Міжнародний семінар в рамках проєкту "SOMPATY: Spectral Optimization: From Mathematics to Physics and Advanced TechnologY"

Nonlinear inverse problem for the equation of propagation of longitudinal waves with non-self-adjoint boundary conditions

by Prof. Elvin I. Azizbayov (The Academy of Public Administration under the President of the Republic of Azerbaijan, Baku, Azerbaijan and Baku State University, Baku, Azerbaijan)

Europe/Kiev
https://zoom.us/j/91749209940?pwd=N2VZYUdFcm1ZdmhkTlkrK2tnVGEwZz09 (ONLINE)

https://zoom.us/j/91749209940?pwd=N2VZYUdFcm1ZdmhkTlkrK2tnVGEwZz09

ONLINE

Description

 Abstract: 

In the presented work the inverse coefficient problem for the equation of propagation of longitudinal waves with non-self-adjoint boundary conditions is investigated. The main purpose of this report is to prove the existence and uniqueness of the classical solution of the considered inverse boundary-value problem. To study the solvability of the inverse problem, we carried out the transition from the original problem to some equivalent auxiliary problem with trivial boundary conditions. Then, using the Fourier method and contraction mappings principle, the solvability of the corresponding auxiliary inverse problem is proved. Furthermore, using the equivalency, the existence and uniqueness of the classical solution of the original problem is shown.

Organised by

Prof. Dr. Carsten Trunk (Technische Universität Ilmenau, Germany)

Andrii Shydlich