English

Generic matrix polynomials with fixed rank and fixed degree

Numerical Analysis 2016-12-14 v1

Abstract

The set Pr,dm×n{\cal P}^{m\times n}_{r,d} of m×nm \times n complex matrix polynomials of grade dd and (normal) rank at most rr in a complex (d+1)mn(d+1)mn dimensional space is studied. For r=1,,min{m,n}1r = 1, \dots , \min \{m, n\}-1, we show that Pr,dm×n{\cal P}^{m\times n}_{r,d} is the union of the closures of the rd+1rd+1 sets of matrix polynomials with rank rr, degree exactly dd, and explicitly described complete eigenstructures. In addition, for the full-rank rectangular polynomials, i.e. r=min{m,n}r= \min \{m, n\} and mnm \neq n, we show that Pr,dm×n{\cal P}^{m\times n}_{r,d} coincides with the closure of a single set of the polynomials with rank rr, degree exactly dd, and the described complete eigenstructure. These complete eigenstructures correspond to generic m×nm \times n matrix polynomials of grade dd and rank at most~rr.

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}
}
R2 v1 2026-06-22T17:21:59.805Z