Generic property and conjugacy classes of homogeneous Borel subalgebras of restricted Lie algebras

Abstract

Let (g,[p]) be a finite-dimensional restricted Lie algebra over an algebraically closed field K of characteristic p>0, and G be the adjoint group of g. We say that g satisfying the generic property if g admits generic tori introduced in BFS. A Borel subalgebra (or Borel for short) of g is by definition a maximal solvable subalgebra containing a maximal torus of g, which is further called generic if additionally containing a generic torus. In this paper, we first settle a conjecture proposed by Premet in Pr2 on regular Cartan subalgebras of restricted Lie algebras. We prove that the statement in the conjecture for a given g is valid if and only if it is the case when g satisfies the generic property. We then classify the conjugay classes of homogeneous Borel subalgebras of the restricted simple Lie algebras g=W(n) under G-conjugation when p>3, and present the representatives of these classes. Here W(n) is the so-called Jacobson-Witt algebra, by definition the derivation algebra of the truncated polynomial ring K[T1,·s,Tn] (T1p,·s,Tnp). We also describe the closed connected solvable subgroups of G associated with those representative Borel subalgebras.