Jordan Type stratification of spaces of commuting nilpotent matrices

Abstract

An n× n nilpotent matrix B is determined up to conjugacy by a partition PB of n, its Jordan type given by the sizes of its Jordan blocks. The Jordan type D(P) of a nilpotent matrix in the dense orbit of the nilpotent commutator of a given nilpotent matrix of Jordan type P is stable - has parts differing pairwise by at least two - and was determined by R. Basili. The second two authors, with B. Van Steirteghem and R. Zhao determined a rectangular table of partitions D-1(Q) having a given stable partition Q as the Jordan type of its maximum nilpotent commutator. They proposed a box conjecture, that would generalize the answer to stable partitions Q having parts: it was proven recently by J.~Irving, T. Kosir and M. Mastnak. Using this result and also some tropical calculations, the authors here determine equations defining the loci of each partition in D-1(Q), when Q is stable with two parts. The equations for each locus form a complete intersection. The authors propose a conjecture generalizing their result to arbitrary stable Q.