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On nonlocal boundary value problems for semilinear differential inclusions
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Citations:

ON NONLOCAL BOUNDARY VALUE PROBLEMS FOR SEMILINEAR DIFFERENTIAL INCLUSIONS
Al-Obaidi Dzh.
Obukhovskiy V.
Authors:
Type:
Article
DOI:
https://doi.org/10.12737/6736
Pages:
from 19 to 21
Status:
Published
Received:
02.12.2014
Accepted:
11.03.2020
Published:
13.11.2014
Language:
Russian
Keywords:
semilinear differential inclusion, Banach space, solution, coincidence topological degree.
Abstract and keywords
Abstract (English):
The paper is devoted to the study of the solvability of semilinear differential inclusions in a separable Banach space using the coincidence topological degree theory.

Keywords:
semilinear differential inclusion, Banach space, solution, coincidence topological degree.
Text

УДК 571.927

О НЕЛОКАЛЬНЫХ ГРАНИЧНЫХ ЗАДАЧАХ

 ДЛЯ ПОЛУЛИНЕЙНЫХ ДИФФЕРЕНЦИАЛЬНЫХ ВКЛЮЧЕНИЙ

ON NONLOCAL BOUNDARY VALUE PROBLEMS

 FOR SEMILINEAR DIFFERENTIAL INCLUSIONS

Аль-ОбаидиДж., аспирант

ОбуховскийВ.В.,д.ф.-м.н., профессор

ФГБОУ ВПО «Воронежский государственный педагогический университет»

г. Воронеж, Россия

alobadi@mail.ruvalerio-ob2000@mail.ru

DOI: 10.12737/6736

 

Аннотация: Работа посвящена исследованию разрешимости полулинейных дифференциальных включений в сепарабельном банаховом пространстве с помощью теории топологической степени совпадения отображений.

Summary:The paper is devoted to the study of the solvability of semilinear differential inclusions in a separable Banach space using the coincidence topological degree theory.

Ключевые слова: полулинейное дифференциальное включение, банахово пространство, решение, топологическая степень совпадения отображений.

 

Keywords: semilinear differential inclusion, Banach space, solution, coincidence topological degree.

References

1. Al´-Obaidi, Dzh. Topologicheskaya stepen´ sovpadeniya fredgol´movykh operatorov i psevdoatsiklicheskikh mnogoznachnykh otobrazheniy. Dzh. Al´-Obaidi, V.V. Obukhovskiy.- Vestnik Tambovskogo gosuniversiteta (v pechati).

2. Condensing multivalued maps and semilinear differential inclusions in Banach spaces. M. Kamenskii, V. Obukhovskii, P. Zecca.- Berlin - New York: Walter de Gruyter, 2001.

This work is licensed under Creative Commons Attribution 4.0 International

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