Christoffel formula for kernel polynomials on the unit circle

Abstract

Given a nontrivial positive measure μ on the unit circle, the associated Christoffel-Darboux kernels are Kn(z, w;μ) = Σk=0nk(w;μ)\,k(z;μ), n ≥ 0, where k(·; μ) are the orthonormal polynomials with respect to the measure μ. Let the positive measure on the unit circle be given by d (z) = |G2m(z)|\, d μ(z), where G2m is a conjugate reciprocal polynomial of exact degree 2m. We establish a determinantal formula expressing \Kn(z,w;)\n ≥ 0 directly in terms of \Kn(z,w;μ)\n ≥ 0. Furthermore, we consider the special case of w=1; it is known that appropriately normalized polynomials Kn(z,1;μ) satisfy a recurrence relation whose coefficients are given in terms of two sets of real parameters \cn(μ)\n=1∞ and \gn(μ)\n=1∞, with 0<gn<1 for n≥ 1. The double sequence \(cn(μ), gn(μ))\n=1∞ characterizes the measure μ. A natural question about the relation between the parameters cn(μ), gn(μ), associated with μ, and the sequences cn(), gn(), corresponding to , is also addressed. Finally, examples are considered, such as the Geronimus weight (a measure supported on an arc of the unit circle), a class of measures given by basic hypergeometric functions, and a class of measures with hypergeometric orthogonal polynomials.