A Single Set Improvement to the 3k-4 Theorem

Abstract

The 3k-4 Theorem is a classical result which asserts that if A,\,B⊂eq Z are finite, nonempty subsets with equationhyp|A+B|=|A|+|B|+r≤ |A|+|B|+\|A|,\,|B|\-3-δ,equation where δ=1 if A and B are translates of each other, and otherwise δ=0, then there are arithmetic progressions PA and PB of common difference such that A⊂eq PA, B⊂eq PB, |B|≤ |PB|+r+1 and |PA|≤ |A|+r+1. It is one of the few cases in Freiman's Theorem for which exact bounds on the sizes of the progressions are known. The hypothesis above is best possible in the sense that there are examples of sumsets A+B having cardinality just one more, yet A and B cannot both be contained in short length arithmetic progressions. In this paper, we show that the hypothesis above can be significantly weakened and still yield the same conclusion for one of the sets A and B. Specifically, if |B|≥ 3, s≥ 1 is the unique integer with (s-1)s(|B|2-1)+s-1<|A|≤ s(s+1)(|B|2-1)+s, and equationhyp2 |A+B|=|A|+|B|+r< (|A|s+|B|2-1)(s+1),equation then we show there is an arithmetic progression PB⊂eq Z with B⊂eq PB and |PB|≤ |B|+r+1. The above hypothesis is best possible (without additional assumptions on A) for obtaining such a conclusion.