On the asymptotic stability of discontinuous systems analysed via the averaging method
| Autor(a) principal: | |
|---|---|
| Data de Publicação: | 2011 |
| Outros Autores: | , |
| Tipo de documento: | Artigo |
| Idioma: | eng |
| Título da fonte: | Repositório Científico de Acesso Aberto de Portugal (Repositórios Cientìficos) |
| Texto Completo: | http://hdl.handle.net/1822/15163 |
Resumo: | The averaging method is one of the most powerful methods used to analyse differential equations appearing in the study of nonlinear problems. The idea behind the averaging method is to replace the original equation by an averaged equation with simple structure and close solutions. A large number of practical problems lead to differential equations with discontinuous right-hand sides. In a rigorous theory of such systems, developed by Filippov, solutions of a differential equation with discontinuous right-hand side are regarded as being solutions to a special differential inclusion with upper semicontinuous right-hand side. The averaging method was studied for such inclusions by many authors using different and rather restrictive conditions on the regularity of the averaged inclusion. In this paper we prove natural extensions of Bogolyubov’s first theorem and the Samoilenko–Stanzhitskii theorem to differential inclusions with an upper semicontinuous right-hand side. We prove that the solution set of the original differential inclusion is contained in a neighbourhood of the solution set of the averaged one. The extension of Bogolyubov’s theorem concerns finite time intervals, while the extension of the Samoilenko–Stanzhitskii theorem deals with solutions defined on the infinite interval. The averaged inclusion is defined as a special upper limit and no additional condition on its regularity is required. |
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On the asymptotic stability of discontinuous systems analysed via the averaging methodDifferential inclusionsAveraging methodDiscontinuous right-hand sideScience & TechnologyThe averaging method is one of the most powerful methods used to analyse differential equations appearing in the study of nonlinear problems. The idea behind the averaging method is to replace the original equation by an averaged equation with simple structure and close solutions. A large number of practical problems lead to differential equations with discontinuous right-hand sides. In a rigorous theory of such systems, developed by Filippov, solutions of a differential equation with discontinuous right-hand side are regarded as being solutions to a special differential inclusion with upper semicontinuous right-hand side. The averaging method was studied for such inclusions by many authors using different and rather restrictive conditions on the regularity of the averaged inclusion. In this paper we prove natural extensions of Bogolyubov’s first theorem and the Samoilenko–Stanzhitskii theorem to differential inclusions with an upper semicontinuous right-hand side. We prove that the solution set of the original differential inclusion is contained in a neighbourhood of the solution set of the averaged one. The extension of Bogolyubov’s theorem concerns finite time intervals, while the extension of the Samoilenko–Stanzhitskii theorem deals with solutions defined on the infinite interval. The averaged inclusion is defined as a special upper limit and no additional condition on its regularity is required.Fundação para a Ciência e a Tecnologia (FCT)Quadro de Referência Estratégico Nacional (QREN)Fundo Europeu de Desenvolvimento Regional (FEDER)Programa Operacional Temático Factores de Competitividade (COMPETE)ElsevierUniversidade do MinhoGama, RicardoGuerman, AnnaSmirnov, Georgi20112011-01-01T00:00:00Zinfo:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/articleapplication/pdfhttp://hdl.handle.net/1822/15163eng0362-546X10.1016/j.na.2010.10.024http://dx.doi.org/10.1016/j.na.2010.10.024info:eu-repo/semantics/openAccessreponame:Repositório Científico de Acesso Aberto de Portugal (Repositórios Cientìficos)instname:Agência para a Sociedade do Conhecimento (UMIC) - FCT - Sociedade da Informaçãoinstacron:RCAAP2023-07-21T12:34:04Zoai:repositorium.sdum.uminho.pt:1822/15163Portal AgregadorONGhttps://www.rcaap.pt/oai/openaireopendoar:71602024-03-19T19:29:41.602016Repositório Científico de Acesso Aberto de Portugal (Repositórios Cientìficos) - Agência para a Sociedade do Conhecimento (UMIC) - FCT - Sociedade da Informaçãofalse |
| dc.title.none.fl_str_mv |
On the asymptotic stability of discontinuous systems analysed via the averaging method |
| title |
On the asymptotic stability of discontinuous systems analysed via the averaging method |
| spellingShingle |
On the asymptotic stability of discontinuous systems analysed via the averaging method Gama, Ricardo Differential inclusions Averaging method Discontinuous right-hand side Science & Technology |
| title_short |
On the asymptotic stability of discontinuous systems analysed via the averaging method |
| title_full |
On the asymptotic stability of discontinuous systems analysed via the averaging method |
| title_fullStr |
On the asymptotic stability of discontinuous systems analysed via the averaging method |
| title_full_unstemmed |
On the asymptotic stability of discontinuous systems analysed via the averaging method |
| title_sort |
On the asymptotic stability of discontinuous systems analysed via the averaging method |
| author |
Gama, Ricardo |
| author_facet |
Gama, Ricardo Guerman, Anna Smirnov, Georgi |
| author_role |
author |
| author2 |
Guerman, Anna Smirnov, Georgi |
| author2_role |
author author |
| dc.contributor.none.fl_str_mv |
Universidade do Minho |
| dc.contributor.author.fl_str_mv |
Gama, Ricardo Guerman, Anna Smirnov, Georgi |
| dc.subject.por.fl_str_mv |
Differential inclusions Averaging method Discontinuous right-hand side Science & Technology |
| topic |
Differential inclusions Averaging method Discontinuous right-hand side Science & Technology |
| description |
The averaging method is one of the most powerful methods used to analyse differential equations appearing in the study of nonlinear problems. The idea behind the averaging method is to replace the original equation by an averaged equation with simple structure and close solutions. A large number of practical problems lead to differential equations with discontinuous right-hand sides. In a rigorous theory of such systems, developed by Filippov, solutions of a differential equation with discontinuous right-hand side are regarded as being solutions to a special differential inclusion with upper semicontinuous right-hand side. The averaging method was studied for such inclusions by many authors using different and rather restrictive conditions on the regularity of the averaged inclusion. In this paper we prove natural extensions of Bogolyubov’s first theorem and the Samoilenko–Stanzhitskii theorem to differential inclusions with an upper semicontinuous right-hand side. We prove that the solution set of the original differential inclusion is contained in a neighbourhood of the solution set of the averaged one. The extension of Bogolyubov’s theorem concerns finite time intervals, while the extension of the Samoilenko–Stanzhitskii theorem deals with solutions defined on the infinite interval. The averaged inclusion is defined as a special upper limit and no additional condition on its regularity is required. |
| publishDate |
2011 |
| dc.date.none.fl_str_mv |
2011 2011-01-01T00:00:00Z |
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info:eu-repo/semantics/publishedVersion |
| dc.type.driver.fl_str_mv |
info:eu-repo/semantics/article |
| format |
article |
| status_str |
publishedVersion |
| dc.identifier.uri.fl_str_mv |
http://hdl.handle.net/1822/15163 |
| url |
http://hdl.handle.net/1822/15163 |
| dc.language.iso.fl_str_mv |
eng |
| language |
eng |
| dc.relation.none.fl_str_mv |
0362-546X 10.1016/j.na.2010.10.024 http://dx.doi.org/10.1016/j.na.2010.10.024 |
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info:eu-repo/semantics/openAccess |
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openAccess |
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application/pdf |
| dc.publisher.none.fl_str_mv |
Elsevier |
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Elsevier |
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Repositório Científico de Acesso Aberto de Portugal (Repositórios Cientìficos) |
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Repositório Científico de Acesso Aberto de Portugal (Repositórios Cientìficos) - Agência para a Sociedade do Conhecimento (UMIC) - FCT - Sociedade da Informação |
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