A polynomial bound in Freiman's theorem

Mei-Chu Chang

doi:10.1215/S0012-7094-02-11331-3

Abstract

In this paper the following improvement on Freiman's theorem on set addition is obtained (see Theorems 1 and 2 in Section 1).

Let $A\subset \mathbb {Z}$ be a finite set such that $|A+A|<\alpha|A|$ . Then A is contained in a proper d-dimensional progression P, where $d\leq [\alpha -1]$ and $\log (|P|/|A|)<C\alpha\sp 2(\log \alpha)\sp 3$$ .

Earlier bounds involved exponential dependence in α in the second estimate. Our argument combines I. Ruzsa's method, which we improve in several places, as well as Y. Bilu's proof of Freiman's theorem.

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Mei-Chu Chang. "A polynomial bound in Freiman's theorem." Duke Math. J. 113 (3) 399 - 419, 15 June 2002. https://doi.org/10.1215/S0012-7094-02-11331-3

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Published: 15 June 2002

First available in Project Euclid: 18 June 2004

zbMATH: 1035.11048

MathSciNet: MR1909605

Digital Object Identifier: 10.1215/S0012-7094-02-11331-3

Subjects:

Primary: 11P70

Secondary: 11B13 , 11B25

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