Voronoi complexes in higher dimensions, cohomology of GLN(Z) for N≥ 8 and the triviality of K8(Z)
Abstract
We enumerate the low dimensional cells in the Voronoi cell complexes attached to the modular groups SLN(Z) and GLN(Z) for N=8,9,10,11, using quotient sublattices techniques for N=8,9 and linear programming methods for higher dimensions. These enumerations allow us to compute some cohomology of these groups and prove that K8(Z) = 0. We deduce from it new knowledge on the Kummer-Vandiver conjecture.
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