Large regular simplices contained in a hypercube with a common barycenter
Abstract
It has been shown that the n-dimensional unit hypercube contains an n-dimensional regular simplex of edge length c n for arbitrary c<1/2 if n is sufficiently large (Maehara, Ruzsa and Tokushige, 2009). We prove the same statement holds for some c>1/2 even in the special case where a regular simplex has the same barycenter as that of the unit hypercube.
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