Generic matrix polynomials with fixed rank and fixed degree
Numerical Analysis
2016-12-14 v1
Abstract
The set of complex matrix polynomials of grade and (normal) rank at most in a complex dimensional space is studied. For , we show that is the union of the closures of the sets of matrix polynomials with rank , degree exactly , and explicitly described complete eigenstructures. In addition, for the full-rank rectangular polynomials, i.e. and , we show that coincides with the closure of a single set of the polynomials with rank , degree exactly , and the described complete eigenstructure. These complete eigenstructures correspond to generic matrix polynomials of grade and rank at most~.
Keywords
Cite
@article{arxiv.1612.04085,
title = {Generic matrix polynomials with fixed rank and fixed degree},
author = {Andrii Dmytryshyn and Froilán M. Dopico},
journal= {arXiv preprint arXiv:1612.04085},
year = {2016}
}