An Operator Method for a Third Order Partial Differential Equation

In this study, the nonlocal boundary value problem for the third order partial differential equation with a self-adjoint positive definite operator in a Hilbert space is investigated. The main theorem on stability estimates for the solution of the problem is established. The application of the main theorem for two types of third order partial differential equations is provided. © 2017 Taylor & Francis.

Авторы

Ashyralyev A. ^1, ^2, ³ , Simsek S.N.⁴

Журнал

Numerical Functional Analysis and Optimization

Издательство

Taylor and Francis Inc.

Номер выпуска

Язык

Английский

Страницы

1341-1359

Статус

Опубликовано

Ссылка

Внешняя ссылка

DOI

10.1080/01630563.2017.1317000

Том

Год

2017

Организации

¹ Department of Mathematics, Near East University, TRNC, Mersin, Turkey
² Department of Mathematics, Peoples’ Friendship University Russia, Moscow, Russian Federation
³ Institute of Mathematics and Mathematical Modeling, Almaty, Kazakhstan
⁴ KAYMEK, Kayseri, Turkey

Ключевые слова

Nonlocal problems; self-adjoint positive definite operator; stability; third- order partial differential equation

Дата создания

19.10.2018

Дата изменения

19.10.2018

Постоянная ссылка

https://repository.rudn.ru/ru/records/article/record/5262/

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