Tur\'an Densities for Small Hypercubes

Abstract

How small can a set of vertices in the n-dimensional hypercube Qn be if it meets every copy of Qd? The asymptotic density of such a set (for d fixed and n large) is denoted by γd. It is easy to see that γd ≤ 1/(d+1), and it is known that γd=1/(d+1) for d ≤ 2, but it was recently shown that γd < 1/(d+1) for d ≥ 8. In this paper we show that the latter phenomenon also holds for d=7 and d=6.

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