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Delaunay polytopes derived from the Leech lattice

Mathieu Dutour SikirićKonstantin Rybnikov — 2014

Journal de Théorie des Nombres de Bordeaux

A Delaunay polytope in a lattice L is perfect if any affine transformation that preserve its Delaunay property is a composite of an homothety and an isometry. Perfect Delaunay polytopes are rare in low dimension and here we consider the ones that one can get in lattice that are sections of the Leech lattice. By doing so we are able to find lattices with several orbits of perfect Delaunay polytopes. Also we exhibit Delaunay polytopes which remain Delaunay in some superlattices. We found...

Inhomogeneous extreme forms

Mathieu Dutour SikirićAchill SchürmannFrank Vallentin — 2012

Annales de l’institut Fourier

G.F. Voronoi (1868–1908) wrote two memoirs in which he describes two reduction theories for lattices, well-suited for sphere packing and covering problems. In his first memoir a characterization of locally most economic packings is given, but a corresponding result for coverings has been missing. In this paper we bridge the two classical memoirs. By looking at the covering problem from a different perspective, we discover the missing analogue. Instead of trying to find lattices giving...

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