Academic Journal
أعرض في EDS

Fractional-Order Degn–Harrison Reaction–Diffusion Model: Finite-Time Dynamics of Stability and Synchronization

التفاصيل البيبلوغرافية
العنوان: Fractional-Order Degn–Harrison Reaction–Diffusion Model: Finite-Time Dynamics of Stability and Synchronization
المؤلفون: Ma’mon Abu Hammad, Issam Bendib, Waseem Ghazi Alshanti, Ahmad Alshanty, Adel Ouannas, Amel Hioual, Shaher Momani
المصدر: Computation, Vol 12, Iss 7, p 144 (2024)
بيانات النشر: MDPI AG, 2024.
سنة النشر: 2024
المجموعة: LCC:Electronic computers. Computer science
مصطلحات موضوعية: finite-time synchronization, Degn–Harrison reaction–diffusion systems, finite-time stability, Lyapunov function, Electronic computers. Computer science, QA75.5-76.95
الوصف: This study aims to address the topic of finite-time synchronization within a specific subset of fractional-order Degn–Harrison reaction–diffusion systems. To achieve this goal, we begin with the introduction of a novel lemma specific for finite-time stability analysis. Diverging from existing criteria, this lemma represents a significant extension of prior findings, laying the groundwork for subsequent investigations. Building upon this foundation, we proceed to develop efficient dependent linear controllers designed to orchestrate finite-time synchronization. Leveraging the power of a Lyapunov function, we derive new, robust conditions that ensure the attainment of synchronization within a predefined time frame. This innovative approach not only enhances our understanding of finite-time synchronization, but also offers practical solutions for its realization in complex systems. To validate the efficacy and applicability of our proposed methodology, extensive numerical simulations are conducted. Through this comprehensive analysis, we aim to contribute valuable insights to the field of fractional-order reaction–diffusion systems while paving the way for practical implementations in real-world applications.
نوع الوثيقة: article
وصف الملف: electronic resource
اللغة: English
تدمد: 2079-3197
Relation: https://www.mdpi.com/2079-3197/12/7/144; https://doaj.org/toc/2079-3197
DOI: 10.3390/computation12070144
URL الوصول: https://doaj.org/article/e55395ae3e434608a0e5087e15fb36d1
رقم الانضمام: edsdoj.55395ae3e434608a0e5087e15fb36d1
قاعدة البيانات: Directory of Open Access Journals
ResultId 1
Header edsdoj
Directory of Open Access Journals
edsdoj.55395ae3e434608a0e5087e15fb36d1
997
3
Academic Journal
academicJournal
997.228698730469
PLink https://search.ebscohost.com/login.aspx?direct=true&site=eds-live&scope=site&db=edsdoj&AN=edsdoj.55395ae3e434608a0e5087e15fb36d1&custid=s6537998&authtype=sso
FullText Array ( [Availability] => 0 )
Array ( [0] => Array ( [Url] => https://doaj.org/article/e55395ae3e434608a0e5087e15fb36d1 [Name] => EDS - DOAJ [Category] => fullText [Text] => View record in DOAJ [MouseOverText] => View record in DOAJ ) )
Items Array ( [Name] => Title [Label] => Title [Group] => Ti [Data] => Fractional-Order Degn–Harrison Reaction–Diffusion Model: Finite-Time Dynamics of Stability and Synchronization )
Array ( [Name] => Author [Label] => Authors [Group] => Au [Data] => <searchLink fieldCode="AR" term="%22Ma%27mon+Abu+Hammad%22">Ma’mon Abu Hammad</searchLink><br /><searchLink fieldCode="AR" term="%22Issam+Bendib%22">Issam Bendib</searchLink><br /><searchLink fieldCode="AR" term="%22Waseem+Ghazi+Alshanti%22">Waseem Ghazi Alshanti</searchLink><br /><searchLink fieldCode="AR" term="%22Ahmad+Alshanty%22">Ahmad Alshanty</searchLink><br /><searchLink fieldCode="AR" term="%22Adel+Ouannas%22">Adel Ouannas</searchLink><br /><searchLink fieldCode="AR" term="%22Amel+Hioual%22">Amel Hioual</searchLink><br /><searchLink fieldCode="AR" term="%22Shaher+Momani%22">Shaher Momani</searchLink> )
Array ( [Name] => TitleSource [Label] => Source [Group] => Src [Data] => Computation, Vol 12, Iss 7, p 144 (2024) )
Array ( [Name] => Publisher [Label] => Publisher Information [Group] => PubInfo [Data] => MDPI AG, 2024. )
Array ( [Name] => DatePubCY [Label] => Publication Year [Group] => Date [Data] => 2024 )
Array ( [Name] => Subset [Label] => Collection [Group] => HoldingsInfo [Data] => LCC:Electronic computers. Computer science )
Array ( [Name] => Subject [Label] => Subject Terms [Group] => Su [Data] => <searchLink fieldCode="DE" term="%22finite-time+synchronization%22">finite-time synchronization</searchLink><br /><searchLink fieldCode="DE" term="%22Degn–Harrison+reaction–diffusion+systems%22">Degn–Harrison reaction–diffusion systems</searchLink><br /><searchLink fieldCode="DE" term="%22finite-time+stability%22">finite-time stability</searchLink><br /><searchLink fieldCode="DE" term="%22Lyapunov+function%22">Lyapunov function</searchLink><br /><searchLink fieldCode="DE" term="%22Electronic+computers%2E+Computer+science%22">Electronic computers. Computer science</searchLink><br /><searchLink fieldCode="DE" term="%22QA75%2E5-76%2E95%22">QA75.5-76.95</searchLink> )
Array ( [Name] => Abstract [Label] => Description [Group] => Ab [Data] => This study aims to address the topic of finite-time synchronization within a specific subset of fractional-order Degn–Harrison reaction–diffusion systems. To achieve this goal, we begin with the introduction of a novel lemma specific for finite-time stability analysis. Diverging from existing criteria, this lemma represents a significant extension of prior findings, laying the groundwork for subsequent investigations. Building upon this foundation, we proceed to develop efficient dependent linear controllers designed to orchestrate finite-time synchronization. Leveraging the power of a Lyapunov function, we derive new, robust conditions that ensure the attainment of synchronization within a predefined time frame. This innovative approach not only enhances our understanding of finite-time synchronization, but also offers practical solutions for its realization in complex systems. To validate the efficacy and applicability of our proposed methodology, extensive numerical simulations are conducted. Through this comprehensive analysis, we aim to contribute valuable insights to the field of fractional-order reaction–diffusion systems while paving the way for practical implementations in real-world applications. )
Array ( [Name] => TypeDocument [Label] => Document Type [Group] => TypDoc [Data] => article )
Array ( [Name] => Format [Label] => File Description [Group] => SrcInfo [Data] => electronic resource )
Array ( [Name] => Language [Label] => Language [Group] => Lang [Data] => English )
Array ( [Name] => ISSN [Label] => ISSN [Group] => ISSN [Data] => 2079-3197 )
Array ( [Name] => NoteTitleSource [Label] => Relation [Group] => SrcInfo [Data] => https://www.mdpi.com/2079-3197/12/7/144; https://doaj.org/toc/2079-3197 )
Array ( [Name] => DOI [Label] => DOI [Group] => ID [Data] => 10.3390/computation12070144 )
Array ( [Name] => URL [Label] => Access URL [Group] => URL [Data] => <link linkTarget="URL" linkTerm="https://doaj.org/article/e55395ae3e434608a0e5087e15fb36d1" linkWindow="_blank">https://doaj.org/article/e55395ae3e434608a0e5087e15fb36d1</link> )
Array ( [Name] => AN [Label] => Accession Number [Group] => ID [Data] => edsdoj.55395ae3e434608a0e5087e15fb36d1 )
RecordInfo Array ( [BibEntity] => Array ( [Identifiers] => Array ( [0] => Array ( [Type] => doi [Value] => 10.3390/computation12070144 ) ) [Languages] => Array ( [0] => Array ( [Text] => English ) ) [PhysicalDescription] => Array ( [Pagination] => Array ( [PageCount] => 1 [StartPage] => 144 ) ) [Subjects] => Array ( [0] => Array ( [SubjectFull] => finite-time synchronization [Type] => general ) [1] => Array ( [SubjectFull] => Degn–Harrison reaction–diffusion systems [Type] => general ) [2] => Array ( [SubjectFull] => finite-time stability [Type] => general ) [3] => Array ( [SubjectFull] => Lyapunov function [Type] => general ) [4] => Array ( [SubjectFull] => Electronic computers. Computer science [Type] => general ) [5] => Array ( [SubjectFull] => QA75.5-76.95 [Type] => general ) ) [Titles] => Array ( [0] => Array ( [TitleFull] => Fractional-Order Degn–Harrison Reaction–Diffusion Model: Finite-Time Dynamics of Stability and Synchronization [Type] => main ) ) ) [BibRelationships] => Array ( [HasContributorRelationships] => Array ( [0] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Ma’mon Abu Hammad ) ) ) [1] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Issam Bendib ) ) ) [2] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Waseem Ghazi Alshanti ) ) ) [3] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Ahmad Alshanty ) ) ) [4] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Adel Ouannas ) ) ) [5] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Amel Hioual ) ) ) [6] => Array ( [PersonEntity] => Array ( [Name] => Array ( [NameFull] => Shaher Momani ) ) ) ) [IsPartOfRelationships] => Array ( [0] => Array ( [BibEntity] => Array ( [Dates] => Array ( [0] => Array ( [D] => 01 [M] => 07 [Type] => published [Y] => 2024 ) ) [Identifiers] => Array ( [0] => Array ( [Type] => issn-print [Value] => 20793197 ) ) [Numbering] => Array ( [0] => Array ( [Type] => volume [Value] => 12 ) [1] => Array ( [Type] => issue [Value] => 7 ) ) [Titles] => Array ( [0] => Array ( [TitleFull] => Computation [Type] => main ) ) ) ) ) ) )
IllustrationInfo