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Poisson <i>C</i>*-algebra derivations in Poisson <i>C</i>*-algebras

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dc.contributor.authorWang, Yongqiao-
dc.contributor.authorPark, Choonkil-
dc.contributor.authorChang, Yuan-
dc.date.accessioned2025-01-02T09:02:01Z-
dc.date.available2025-01-02T09:02:01Z-
dc.date.issued2024-12-
dc.identifier.issn0420-1213-
dc.identifier.issn2391-4661-
dc.identifier.urihttps://scholarworks.bwise.kr/hanyang/handle/2021.sw.hanyang/204229-
dc.description.abstractIn this study, we introduce the following additive functional equation: g ( lambda u + v + 2 y ) = lambda g ( u ) + g ( v ) + 2 g ( y ) g\left(\lambda u+v+2y)=\lambda g\left(u)+g\left(v)+2g(y) for all lambda is an element of C \lambda \in {\mathbb{C}} , all unitary elements u , v u,v in a unital Poisson C * {C}&lt;^&gt;{* } -algebra P P , and all y is an element of P y\in P . Using the direct method and the fixed point method, we prove the Hyers-Ulam stability of the aforementioned additive functional equation in unital Poisson C * {C}&lt;^&gt;{* } -algebras. Furthermore, we apply to study Poisson C * {C}&lt;^&gt;{* } -algebra homomorphisms and Poisson C * {C}&lt;^&gt;{* } -algebra derivations in unital Poisson C * {C}&lt;^&gt;{* } -algebras.-
dc.description.abstractIn this study, we introduce the following additive functional equation: g(λu + v + 2y) = λg(u) + g(v) + 2g(y) for all λ ∈ C, all unitary elements u, v in a unital Poisson C*-algebra P, and all y ∈ P.Using the direct method and the fixed point method, we prove the Hyers-Ulam stability of the aforementioned additive functional equation in unital Poisson C*-algebras.Furthermore, we apply to study Poisson C*-algebra homomorphisms and Poisson C*-algebra derivations in unital Poisson C*-algebras.-
dc.format.extent19-
dc.language영어-
dc.language.isoENG-
dc.publisherPolitechnika Warszawska-
dc.titlePoisson &lt;i&gt;C&lt;/i&gt;*-algebra derivations in Poisson &lt;i&gt;C&lt;/i&gt;*-algebras-
dc.title.alternativePoisson C*-algebra derivations in Poisson C*-algebras-
dc.typeArticle-
dc.publisher.location폴란드-
dc.identifier.doi10.1515/dema-2024-0053-
dc.identifier.scopusid2-s2.0-85213068511-
dc.identifier.wosid001372975600001-
dc.identifier.bibliographicCitationDemonstratio Mathematica, v.57, no.1, pp 1 - 19-
dc.citation.titleDemonstratio Mathematica-
dc.citation.volume57-
dc.citation.number1-
dc.citation.startPage1-
dc.citation.endPage19-
dc.type.docTypeArticle-
dc.description.isOpenAccessN-
dc.description.journalRegisteredClassscie-
dc.description.journalRegisteredClassscopus-
dc.relation.journalResearchAreaMathematics-
dc.relation.journalWebOfScienceCategoryMathematics-
dc.subject.keywordPlusFUNCTIONAL-EQUATION-
dc.subject.keywordPlusSTABILITY-
dc.subject.keywordAuthorHyers-Ulam stability-
dc.subject.keywordAuthorfixed point method-
dc.subject.keywordAuthoradditive functional equation-
dc.subject.keywordAuthorPoisson C (*)-algebra derivation in Poisson C (*)-algebra-
dc.subject.keywordAuthorPoisson C (*)-algebra homomorphism in Poisson C (*)-algebra-
dc.identifier.urlhttps://www.degruyter.com/document/doi/10.1515/dema-2024-0053/html-
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