Rectangles, integer vectors and hyperplanes of the hypercube
Abstract
We introduce a family of nonnegative integer vectors - primitive vectors - defining hyperplanes of the real affine cube over Cn:=\-1,1\n and study their properties with respect to the rectangles of the cube. As a consequence we give a short proof that, for small dimensions (n≤ 7), the real affine cube can be recovered from its signed rectangles and its signed cocircuits complementary of its facets and skew-facets.
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