Varieties of Elementary Abelian Lie Algebras and Degrees of Modules

Abstract

Let (g,[p]) be a restricted Lie algebra over an algebraically closed field k of characteristic p\! \!3. Motivated by the behavior of geometric invariants of the so-called (g,[p])-modules of constant j-rank (j ∈ \1,…,p\!-\!1\), we study the projective variety E(2,g) of two-dimensional elementary abelian subalgebras. If p\!\!5, then the topological space E(2,g/C(g)), associated to the factor algebra of g by its center C(g), is shown to be connected. We give applications concerning categories of (g,[p])-modules of constant j-rank and certain invariants, called j-degrees.