On the stability of nonlocal boundary value problem for a third order PDE

In the present paper, we study the nonlocal boundary value problem for third order partial differential equations in a Hilbert space with a self-adjoint positive definite operator. The main theorem on stability of this problem is established. In Applications, stability estimates for the solution of two problems for third order partial differential equations are obtained. © 2019 Author(s).

Authors

Ashyralyev A. ^1, ^2, ³ , Belakroum K.⁴

Conference proceedings

AIP Conference Proceedings

Language

English

Status

Published

DOI

10.1063/1.5136174

Number

070012

Volume

2183

Year

2019

Organizations

¹ Department of Mathematics, Near East University, Nicosia, Mersin 10, Turkey
² Peoples' Friendship University of Russia, RUDN University, Moscow, 117198, Russian Federation
³ Institute of Mathematics and Mathematical Modeling, Almaty, 050010, Kazakhstan
⁴ Department of Mathematics, Mentouri Brothers University, Constantine, Algeria

Keywords

Boundary value problems; Self-adjoint positive definite operator; Stability

Date of creation

10.02.2020

Date of change

10.02.2020

Short link

https://repository.rudn.ru/en/records/article/record/56288/

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ON ELLIPTIC DIFFERENTIAL AND DIFFERENCE PROBLEMS IN A HILBERT SPACE WITH SPECIAL TYPE NONLOCAL CONDITIONS

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AIP Conference Proceedings. Vol. 2183. 2019.

On the stability of nonlocal boundary value problem for a third order PDE

Other records

SOME ASPECTS OF RUSSIAN-CHINESE RELATIONS IN THE SECOND HALF OF THE XIX CENTURY. PART 2

ON ELLIPTIC DIFFERENTIAL AND DIFFERENCE PROBLEMS IN A HILBERT SPACE WITH SPECIAL TYPE NONLOCAL CONDITIONS