On the varieties of nilpotent Lie algebras of dimension 7 and 8

In the paper one- and two-dimensional cohomology is compared for finite and infinite nilpotent Lie algebras, with coefficients in the adjoint representation. It turns out that, because the adjoint representation is not a highest weight representation in infinite dimension, the considered cohomology

a poset by saying u F ¨if u is on the path from r to ¨. Let Z P be the span of all matrices z such that u -¨, where z is the n = n matrix with a 1 in the u, ü¨P u ẅ x Ž .

We describe the upper and lower Lie nilpotency index of a modular group algebra ‫ކ‬G of some metabelian group G and apply these results to determine the nilpotency class of the group of units, extending certain results of Shalev without restriction to finite groups. A characterization of modular gro

Let G 4 be the unique, connected, simply connected, four-dimensional, nilpotent Lie group. In this paper, the discrete cocompact subgroups H of G 4 are classified and shown to be in 1-1 correspondence with triples p 1 p 2 p 3 ∈ 3 that satisfy p 2 p 3 > 0 and a certain restriction on p 1 . The K-grou