On triangular similarity of nilpotent triangular matrices
Abstract
Let (resp. , ) be the set of nonsingular (resp. unit, nilpotent) upper triangular matrices. We use a novel approach to explore the -similarity orbits in . The Belitski\u{\i}'s canonical form of under -similarity is in where is the subpermutation such that . Using graph representations and -similarity actions stablizing , we obtain new properties of the Belitski\u{\i}'s canonical forms and present an efficient algorithm to find the Belitski\u{\i}'s canonical forms in . As consequences, we construct new Belitski\u{\i}'s canonical forms in all 's, list all Belitski\u{\i}'s canonical forms for , and show examples of 3-nilpotent Belitski\u{\i}'s canonical forms in with arbitrary numbers of parameters up to .
Cite
@article{arxiv.2002.10088,
title = {On triangular similarity of nilpotent triangular matrices},
author = {Ming-Cheng Tsai and Meaza Bogale and Huajun Huang},
journal= {arXiv preprint arXiv:2002.10088},
year = {2020}
}
Comments
Corresponding author: Huajun Huang