Associated orthogonal polynomials of the first kind and Darboux transformations

Let u be a quasi-definite linear functional defined on the linear space of polynomials P with complex coefficients. For such a functional we can define a sequence of monic orthogonal polynomials (SMOP in short) (P-n)(n is an element of N), which satisfies a three term recurrence relation. If we increase the indices of the recurrence relation by one unity, then we get the sequence of associated polynomials of the first kind as solution. These polynomials will be orthogonal with respect to a linear functional denoted by u((1)). In the literature two special transformations of the functional u are studied, the canonical Christoffel transformation (u) over slide & nbsp; = (x - c)u and the canonical Geronimus transformation (A) over tilde & nbsp; = (x - c)(-1)u + M delta(c), where c is a fixed complex number, M is a free complex parameter and delta c is the linear functional defined on P as (delta(c,) p(x)) = p(c). For the Christoffel transformation with SMOP ( P-n)n is an element of N, we are interested in analyzing the relation between the linear functionals u(1) and (u)oc=ver slide((1).) The super index denotes the linear functionals associated with the orthogonal polynomial sequences of the first kind (P-n(1))n is an element of N and ((P) over slide(n)((1)) )(n is an element of N), respectively. This problem is also studied for Geronimus transformations. Here we give close relations between their corresponding monic Jacobi matrices by using the LU and UL factorizations. To get this result, we first need to study the relation between u(-1) (the inverse functional) and u((1)) which can be given from a quadratic Geronimus transformation. (C)& nbsp;2021 Elsevier Inc. All rights reserved.& nbsp;

Automated summary

This article explores quasi-definite linear functionals defined on polynomial spaces and the associated orthogonal polynomial sequences. It analyzes the relations between linear functionals under different transformations. By using LU and UL factorizations, close relations between their corresponding Jacobi matrices are obtained.