Commuting varieties in bad characteristic

Abstract

Let k be an algebraically closed field of characteristic 2. We consider the commuting variety and the commuting nilpotent variety of the Lie algebra sp2n, namely the sets C2(sp2n)=\ (x,y) ∈ sp2n × sp2n [x,y]=0\ and C2nil(sp2n)=\ (x,y) ∈ sp2n × sp2n x,y nilpotent, [x,y]=0\ and prove that they are both irreducible, of dimensions (sp2n) + 2n and (sp2n) + n-1, respectively.