This book sets out an account of the tools which Frobenius used to discover representation theory for nonabelian groups and describes its modern applications. It provides a new viewpoint from which one can examine various aspects of representation theory and areas of application, such as probability theory and harmonic analysis. For example, the focal objects of this book, group matrices, can be thought of as a generalization of the circulant matrices which are behind many important algorithms in information science. The book is designed to appeal to several audiences, primarily mathematicians working either in group representation theory or in areas of mathematics where representation theory is involved. Parts of it may be used to introduce undergraduates to representation theory by studying the appealing pattern structure of group matrices. It is also intended to attract readers who are curious about ideas close to the heart of group representation theory, which do not usually appear in modern accounts, but which offer new perspectives.
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This book sets out an account of the tools which Frobenius used to discover representation theory for nonabelian groups and describes its modern applications.
- Multiplicative Forms on Algebras and the Group Determinant. - Further GroupMatrices and Group Determinants. - Norm Forms and Group Determinant Factors. - S-Rings, Gelfand Pairs and Association Schemes. - The 2-Characters of a Group and theWeak Cayley Table. - The Extended k-Characters. - Fourier Analysis on Groups, Random Walks and Markov Chains. - K-Characters and n-Homomorphisms. - K-Characters and n-Homomorphisms. - Other Situations Involving Group Matrices. - Spherical Functions on Groups. - The Personal Characteristics of Frobenius.
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This book sets out an account of the tools which Frobenius used to discover representation theory for nonabelian groups and describes its modern applications. It provides a new viewpoint from which one can examine various aspects of representation theory and areas of application, such as probability theory and harmonic analysis. For example, the focal objects of this book, group matrices, can be thought of as a generalization of the circulant matrices which are behind many important algorithms in information science. The book is designed to appeal to several audiences, primarily mathematicians working either in group representation theory or in areas of mathematics where representation theory is involved. Parts of it may be used to introduce undergraduates to representation theory by studying the appealing pattern structure of group matrices. It is also intended to attract readers who are curious about ideas close to the heart of group representation theory, which do not usually appear in modern accounts, but which offer new perspectives.
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“The book is clearly written and presents many little known facts about group matrices. No other book deals so thoroughly with this topic.” (John D. Dixon, zbMATH 1458.20001, 2021)
The simple tools described provide a new way of looking at group representation theory and its applications Offers an insight into the mind of one of the great mathematicians Much of the work described has not previously appeared in book form
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Produktdetaljer

ISBN
9783030282998
Publisert
2019-11-09
Utgiver
Vendor
Springer Nature Switzerland AG
Høyde
235 mm
Bredde
155 mm
Aldersnivå
Research, P, 06
Språk
Product language
Engelsk
Format
Product format
Heftet

Forfatter

Biographical note

The author was born in Manchester, England. He has an undergraduate degree from Trinity College, Oxford and a doctorate from Queen Mary College, London. He taught at the University of The West Indies in Jamaica from 1971-1984 and has been teaching at Penn State Abington from 1984 until the present, with visiting positions (a) Iowa State University (1988-90) , (b)  Queens College, CUNY, (first   Gorenstein Professor, Spring 1998) and Brigham Young University (Spring 2006).