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

Abstract

Given a matrix polynomial W(x), matrix bi-orthogonal polynomials with respect to the sesquilinear form P(x),Q(x)W=∫ P(x) W(x)dμ(x)(Q(x)), P(x),Q(x)∈ Rp× p[x], where μ(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 ·,·W and matrix polynomials orthogonal with respect to μ(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.