On the variety of four dimensional lie algebras

Abstract

Lie algebras of dimension n are defined by their structure constants , which can be seen as sets of N = n2 (n -- 1)/2 scalars (if we take into account the skew-symmetry condition) to which the Jacobi identity imposes certain quadratic conditions. Up to rescaling, we can consider such a set as a point in the projective space PN--1. Suppose n =4, hence N = 24. Take a random subspace of dimension 12 in P23 , over the complex numbers. We prove that this subspace will contain exactly 1033 points giving the structure constants of some four dimensional Lie algebras. Among those, 660 will be isomorphic to gl\2 , 195 will be the sum of two copies of the Lie algebra of one dimensional affine transformations, 121 will have an abelian, three-dimensional derived algebra, and 57 will have for derived algebra the three dimensional Heisenberg algebra. This answers a question of Kirillov and Neretin.