The commuting variety of pgln
Abstract
We are considering the commuting variety of the Lie algebra pgln over an algebraically closed field of characteristic p >0, namely the set of pairs \ (A,B) ∈ pgln × pgln [A,B]=0 \ . We prove that if n=pr, then there are precisely two irreducible components, of dimensions n2+r-1 and n2+n-2. We also prove that the variety \ (x,y) ∈ GLn(k) × GLn(k) [x,y]=ζ I \ is irreducible of dimension n2 +n/d, where ζ is a root of unity of order d with d dividing n.
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