The poset of the nilpotent commutator of a nilpotent matrix

Abstract

Let B be an n × n nilpotent matrix with entries in an infinite field . Assume that B is in Jordan canonical form with the associated Jordan block partition P. In this paper, we study a poset DP associated to the nilpotent commutator of B and a certain partition of n, denoted by λU(P), defined in terms of the lengths of unions of special chains in DP. Polona Oblak associated to a given partition P another partition Ob(P) resulting from a recursive process. She conjectured that Ob(P) is the same as the Jordan partition Q(P) of a generic element of the nilpotent commutator of B. Roberta Basili, Anthony Iarrobino and the author later generalized the process introduced by Oblak. In this paper we show that all such processes result in the partition λU(P).