Perfect but not generating Delaunay polytopes

Abstract

In his seminal 1951 paper "Extreme forms" Coxeter cox51 observed that for n 9 one can add vectors to the perfect lattice 9 so that the resulting perfect lattice, called 92 by Coxeter, has exactly the same set of minimal vectors. An inhomogeneous analog of the notion of perfect lattice is that of a lattice with a perfect Delaunay polytope: the vertices of a perfect Delaunay polytope are the analogs of minimal vectors in a perfect lattice. We find a new infinite series P(n,s) for s≥ 2 and n+1≥ 4s of n-dimensional perfect Delaunay polytopes. A remarkable property of this series is that for certain values of s and all n 13 one can add points to the integer affine span of P(n,s) in such a way that P(n,s) remains a perfect Delaunay polytope in the new lattice. Thus, we have constructed an inhomogeneous analog of the remarkable relationship between 9 and 92.