Commuting varieties of r-tuples over Lie algebras

Abstract

Let G be a simple algebraic group defined over an algebraically closed field k of characteristic p and let be the Lie algebra of G. It is well known that for p large enough the spectrum of the cohomology ring for the r-th Frobenius kernel of G is homeomorphic to the commuting variety of r-tuples of elements in the nilpotent cone of [Suslin-Friedlander-Bendel, J. Amer. Math. Soc, 10 (1997), 693--728]. In this paper, we study both geometric and algebraic properties including irreducibility, singularity, normality and Cohen-Macaulayness of the commuting varieties Cr(gl2), Cr(2) and Cr() where is the nilpotent cone of 2. Our calculations lead us to state a conjecture on Cohen-Macaulayness for commuting varieties of r-tuples. Furthermore, in the case when =2, we obtain interesting results about commuting varieties when adding more restrictions into each tuple. In the case of 3, we are able to verify the aforementioned properties for Cr(). Finally, applying our calculations on the commuting variety Cr() where is the closure of the subregular orbit in 3, we prove that the nilpotent commuting variety Cr() has singularities of codimension 2.