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dc.contributor.authorTeerapong Suksumranen_US
dc.date.accessioned2018-09-05T04:33:11Z-
dc.date.available2018-09-05T04:33:11Z-
dc.date.issued2018-01-01en_US
dc.identifier.issn19316836en_US
dc.identifier.issn19316828en_US
dc.identifier.other2-s2.0-85049680519en_US
dc.identifier.other10.1007/978-3-319-74325-7_20en_US
dc.identifier.urihttps://www.scopus.com/inward/record.uri?partnerID=HzOxMe3b&scp=85049680519&origin=inwarden_US
dc.identifier.urihttp://cmuir.cmu.ac.th/jspui/handle/6653943832/58827-
dc.description.abstract© 2018, Springer International Publishing AG, part of Springer Nature. This article explores a remarkable connection between Cauchy’s functional equation, Schur’s lemma in representation theory, the one-dimensional relativistic velocities in special relativity, and Möbius’s functional equation. Möbius’s exponential equation is a functional equation defined by f(a⊕Mb)=f(a)f(b),$$\displaystyle f(a\oplus _M b) = f(a)f(b), $$ where ⊕Mis Möbius addition given by a⊕Mb=a+b1+āb for all complex numbers a and b of modulus less than one, and the product f(a)f(b) is taken in the field of complex numbers. We indicate that, in some sense, Möbius’s exponential equation is an extension of Cauchy’s exponential equation. We also exhibit a one-to-one correspondence between the irreducible linear representations of an abelian group on a complex vector space and the solutions of Cauchy’s exponential equation and extend this to the case of Möbius’s exponential equation. We then give the complete family of Borel measurable solutions to Cauchy’s exponential equation with domain as the group of one-dimensional relativistic velocities under the restriction of Möbius addition.en_US
dc.subjectMathematicsen_US
dc.titleCauchy’s Functional Equation, Schur’s Lemma, One-Dimensional Special Relativity, and Möbius’s Functional Equationen_US
dc.typeBook Seriesen_US
article.title.sourcetitleSpringer Optimization and Its Applicationsen_US
article.volume131en_US
article.stream.affiliationsChiang Mai Universityen_US
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