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2013 | OriginalPaper | Buchkapitel

1. Hadamard Sets

verfasst von : Colin C. Graham, Kathryn E. Hare

Erschienen in: Interpolation and Sidon Sets for Compact Groups

Verlag: Springer US

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Abstract

Hadamard sets before 1960. Interpolation on Hadamard sets. Sums and differences of a Hadamard set with itself. Bohr cluster points of those sum and differences.

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Nächstes Kapitel ε-Kronecker Sets
Fußnoten
1
“Lacunary” is also used for increasing sequences {n j } ⊂ ℕ with \({n}_{j+1} - {n}_{j} \rightarrow \infty \). Also, some authors, for example, [101], say a symmetric \(\mathbf{E} \subset \mathbb{Z}\) is “Hadamard” if E ∩ ℕ is Hadamard in our sense.
 
2
Méla writes that “rapellons” there refers to an unpublished part of his thèse [131].
 
3
We define “Hadamard set” in \(\mathbb{R}\) exactly as in ℕ.
 
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Metadaten
Titel
Hadamard Sets
verfasst von
Colin C. Graham
Kathryn E. Hare
Copyright-Jahr
2013
Verlag
Springer US
Buch
Interpolation and Sidon Sets for Compact Groups

Print ISBN: 978-1-4614-5391-8

Electronic ISBN: 978-1-4614-5392-5

Copyright-Jahr: 2013

DOI
https://doi.org/10.1007/978-1-4614-5392-5_1