Paul Potgieter
Published 2010-05-07, updated 2010-07-13Version 2
Given a subset of the integers of zero density, we define the weaker notion of fractional density of such a set. It is shown how this notion corresponds to that of the Hausdorff dimension of a compact subset of the reals. We then show that a version of a theorem of {\L}aba and Pramanik on 3-term arithmetic progressions in subsets of the unit interval also holds for subsets of the integers with fractional density and satisfying certain Fourier-decay conditions.
On the coefficients of power sums of arithmetic progressions
Valuations, arithmetic progressions, and prime numbers
The least modulus for which consecutive polynomial values are distinct
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