A strengthening of Freiman's 3k−4$3k-4$ theorem

Béla Bollobás, Imre Leader, Marius Tiba

Type: Article

Publication Date: 2023-05-25

Citations: 0

DOI: https://doi.org/10.1112/blms.12862

Abstract

Abstract In its usual form, Freiman's theorem states that if and are subsets of of size with small sumset (of size close to ), then they are very close to arithmetic progressions. Our aim in this paper is to strengthen this by allowing only a bounded number of possible summands from one of the sets. We show that if and are subsets of of size such that for any four‐element subset of the sumset has size not much more than , then already this implies that and are very close to arithmetic progressions.

Locations

Bulletin of the London Mathematical Society - View - PDF
Apollo (University of Cambridge) - View - PDF

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+	On addition of two distinct sets of integers	1995	Vsevolod F. Lev Pavel Smeliansky
+	Small Doubling in Groups	2013	Emmanuel Breuillard Ben Green Terence Tao
+	Summenmengen in lokalkompakten abelschen Gruppen	1956	Martin Kneser
+	Additive Combinatorics	2006	Terence Tao Van H. Vu