Bidiagonal factorization of tetradiagonal matrices and Darboux transformations
Abstract
Recently a spectral Favard theorem for bounded banded lower Hessenberg matrices that admit a positive bidiagonal factorization was presented. These type of matrices are oscillatory. In this paper the Lima-Loureiro hypergeometric multiple orthogonal polynomials and the Jacobi-Pi\~neiro multiple orthogonal polynomials are discussed at the light of this bidiagonal factorization for tetradiagonal matrices. The Darboux transformations of tetradiagonal Hessenberg matrices is studied and Christoffel formulas for the elements of the bidiagonal factorization are given, i.e., the bidiagonal factorization is given in terms of the recursion polynomials evaluated at the origin.
Cite
@article{arxiv.2210.10727,
title = {Bidiagonal factorization of tetradiagonal matrices and Darboux transformations},
author = {Amílcar Branquinho and Ana Foulquié-Moreno and Manuel Mañas},
journal= {arXiv preprint arXiv:2210.10727},
year = {2022}
}
Comments
This is the third part of the splitting of the paper arXiv:2203.13578 into three. 15 pages and 1 figure