Christoffel transformations for matrix orthogonal polynomials in the real line and the non-Abelian 2D Toda lattice hierarchy

TL;DR

This paper develops Christoffel transformations for matrix orthogonal polynomials on the real line, generalizes classical formulas using Jordan chains, and extends these results to the non-Abelian 2D Toda lattice hierarchy.

Contribution

It introduces a generalized Christoffel formula for matrix orthogonal polynomials with nonsingular perturbations and extends the framework to the non-Abelian 2D Toda hierarchy.

Findings

Derived connection formulas between bi-orthogonal and orthogonal matrix polynomials.

Generalized Christoffel formula using Jordan chains for nonsingular perturbations.

Extended results to the non-Abelian 2D Toda lattice hierarchy.

Abstract

Given a matrix polynomial $W(x)$, matrix bi-orthogonal polynomials with respect to the sesquilinear form $\langle P(x),Q(x)\rangle_W=\int P(x) W(x)\operatorname{d}\mu(x)(Q(x))^{\top}$, $P(x),Q(x)\in\mathbb R^{p\times p}[x]$, where $\mu(x)$ is a matrix of Borel measures supported in some infinite subset of the real line, are considered. Connection formulas between the sequences of matrix bi-orthogonal polynomials with respect to $\langle \cdot,\cdot\rangle_W$ and matrix polynomials orthogonal with respect to $\mu(x)$ are presented. In particular, for the case of nonsingular leading coefficients of the perturbation matrix polynomial $W(x)$ we present a generalization of the Christoffel formula constructed in terms of the Jordan chains of $W(x)$. For perturbations with a singular leading coefficient several examples by Dur\'an et al are revisited. Finally, we extend these results to the non-Abelian 2D Toda lattice hierarchy.