Slicing all Edges of an n-cube Requires n2/3 Hyperplanes
Abstract
Consider the n-cube graph with vertices \-1,1\n and edges connecting vertices with hamming distance 1. How many hyperplanes in Rn are needed in order to dissect all edges? We show that at least (n2/3) are needed, which improves the previous bound of (n0.51) by Yehuda and Yehudayoff.
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