Long Arithmetic Progressions in Sets with Small Sumset
Abstract
Let A, B⊂eq Z be finite, nonempty subsets with A= B=0, and let δ(A,B)=arrayll 1 & if A⊂eq B, 0 & otherwise. If B≤ A≤ |A|+|B|-3 and one|A+B|≤ |A|+2|B|-3-δ(A,B), then we show A+B contains an arithmetic progression with difference 1 and length |A|+|B|-1. As a corollary, if one holds, (B)≤ (A) and either (A)=1 or else (A+B)=1 and |A+B|≤ 2|A|+|B|-3, then A+B contains an arithmetic progression with difference 1 and length |A|+|B|-1.
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