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The class L(log L)α and some lacunary sets
Part of:
Harmonic analysis in one variable
Published online by Cambridge University Press: 09 April 2009
Abstract
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A well-known result of Zygmund states that if f ∈ L (log+L) ½ on the circle group T and E is a Hadamard set of integers, then 
. In this paper we investigate similar results for the classes 
on an arbitrary infinite compact abelian group G and Sidon subsets E of the dual Γ. These results are obtained as special cases of more general results concerning a new class of lacunary sets Sαβ, 0 < α ≤ β, where a subset E of Γ is an Sα β set if 
. We also prove partial results on the distinctness of the Sαβ sets in the index β.
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- Copyright © Australian Mathematical Society 1995
References
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