Reducibility of nilpotent commuting varieties

Abstract

Let n be the set of nilpotent n by n matrices over an algebraically closed field k. For each r 2, let Cr(n) be the variety consisting of all pairwise commuting r-tuples of nilpotent matrices. It is well-kown that C2(n) is irreducible for every n. We study in this note the reducibility of Cr(n) for various values of n and r. In particular it will be shown that the reducibility of Cr(gln), the variety of commuting r-tuples of n by n matrices, implies that of Cr(n) under certain condition. Then we prove that Cr(n) is reducible for all n, r 4. The ingredients of this result are also useful for getting a new lower bound of the dimensions of Cr(n) and Cr(gln). Finally, we investigate values of n for which the variety C3(n) of nilpotent commuting triples is reducible.