Infinite serie of extreme Delaunay polytopes
Abstract
A Delaunay polytope P is said to be extreme if the only (up to isometries) affine bijective transformations f of n, for which f(P) is again a Delaunay polytope, are the homotheties. This notion was introduced in DGL92; also some examples in dimension 1, 6, 7, 15, 16, 22, 23 were constructed and it was proved that in dimension less than 6 there are no extreme Delaunay polytopes, except the segment. In this note, for every n≥ 6 we build an extreme Delaunay polytope EDn of dimension n.
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