Torsion table for the Lie algebra niln

Abstract

We study the Lie ring niln of all strictly upper-triangular n\!×\!n matrices with entries in Z. Its complete homology for n\!≤\!8 is computed. We prove that every pm-torsion appears in H(niln;Z) for pm\!≤\!n\!-\!2. For m\!=\!1, Dwyer proved that the bound is sharp, i.e. there is no p-torsion in H(niln;Z) when prime p\!>\!n\!-\!2. In general, for m\!>\!1 the bound is not sharp, as we show that there is 8-torsion in H(nil8;Z). As a sideproduct, we derive the known result, that the ranks of the free part of H(niln;Z) are the Mahonian numbers (=number of permutations of [n] with k inversions), using a different approach than Kostant. Furthermore, we determine the algebra structure (cup products) of H(niln;Q).