Small kissing polytopes
Abstract
A lattice (d,k)-polytope is the convex hull of a set of points in Rd whose coordinates are integers ranging between 0 and k. We consider the smallest possible distance (d,k) between two disjoint lattice (d,k)-polytopes. We propose an algebraic model for this distance and derive from it an explicit formula for (2,k). Our model also allows for the computation of previously intractable values of (d,k). In particular, we compute (3,k) when 4≤k≤8, (4,k) when 2≤k≤3, and (6,1).
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