Nilpotent commuting varieties of the Witt algebra

Abstract

Let g be the p-dimensional Witt algebra over an algebraically closed field k of characteristic p>3. Let N=x∈ x[p]=0 be the nilpotent variety of g, and C(N):=\(x,y)∈ N×N [x,y]=0\ the nilpotent commuting variety of g. As an analogue of Premet's result in the case of classical Lie algebras [A. Premet, Nilpotent commuting varieties of reductive Lie algebras. Invent. Math., 154, 653-683, 2003.], we show that the variety C(N) is reducible and equidimensional. Irreducible components of C(N) and their dimension are precisely given. Furthermore, the nilpotent commuting varieties of Borel subalgebras are also determined.