The Salem-Zygmund Theorem

Bertin, M. J.; Decomps-Guilloux, A.; Grandet-Hugot, M.; Pathiaux-Delefosse, M.; Schreiber, J. P.

The Salem-Zygmund Theorem

M. J. Bertin, A. Decomps-Guilloux, M. Grandet-Hugot, M. Pathiaux-Delefosse and J. P. Schreiber
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M. J. Bertin: Université Pierre et Marie Curie Mathématiques
A. Decomps-Guilloux: Université Pierre et Marie Curie Mathématiques
M. Grandet-Hugot: Université de Caen Mathématiques
M. Pathiaux-Delefosse: Université Pierre et Marie Curie Mathématiques
J. P. Schreiber: Université d’Orléans, Château de la Source

Chapter Chapter 15 in Pisot and Salem Numbers, 1992, pp 271-291 from Springer

Abstract: Abstract The Salem-Zygmimd theorem, about sets of uniqueness in the theory of trigonometric series, is certainly the result that has given Pisot numbers most of their renown, at least among analysts.

Keywords: Compact Group; Haar Measure; Algebraic Number; Trigonometric Series; Compact Abelian Group (search for similar items in EconPapers)
Date: 1992
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DOI: 10.1007/978-3-0348-8632-1_15

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