Sets avoiding six-term arithmetic progressions in $\mathbb{Z}_6^n$ are exponentially small

Richárd Palincza

Sets avoiding six-term arithmetic progressions in Z6n are exponentially small

Abstract

We show that sets avoiding 6-term arithmetic progressions in Z6n have size at most 5.709n. It is also pointed out that the "product construction" does not work in this setting, specially, we show that for the extremal sizes in small dimensions we have r6(Z6)=5, r6(Z62)=25 and 116≤ r6(Z63)≤ 124.

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