On triangular similarity of nilpotent triangular matrices

Abstract

Let Bn (resp. Un, Nn) be the set of n× n nonsingular (resp. unit, nilpotent) upper triangular matrices. We use a novel approach to explore the Bn-similarity orbits in Nn. The Belitski's canonical form of A∈ Nn under Bn-similarity is in QUn where Q is the subpermutation such that A∈ Bn QBn. Using graph representations and Un-similarity actions stablizing QUn, we obtain new properties of the Belitski's canonical forms and present an efficient algorithm to find the Belitski's canonical forms in Nn. As consequences, we construct new Belitski's canonical forms in all Nn's, list all Belitski's canonical forms for n=7, 8, and show examples of 3-nilpotent Belitski's canonical forms in Nn with arbitrary numbers of parameters up to O(n2).