Modulated Bi-orthogonal Polynomials on the Unit Circle: The 2j-k and j-2k Systems

Abstract

We construct the systems of bi-orthogonal polynomials on the unit circle where the Toeplitz structure of the moment determinants is replaced by (w2j-k)0≤ j,k ≤ N-1 and the corresponding Vandermonde modulus squared is replaced by Π1 j < k N(ζ2k - ζ2j)(ζ-1k - ζ-1j) . This is the simplest case of a general system of pj-qk with p,q co-prime integers. We derive analogues of the structures well known in the Toeplitz case: third order recurrence relations, determinantal and multiple-integral representations, their reproducing kernel and Christoffel-Darboux sum, and associated (Carath\'eodory) functions. We close by giving full explicit details for the system defined by the simple weight w(ζ)=eζ, which is a specialisation of a weight arising from averages of moments of derivatives of characteristic polynomials over USp(2N), SO(2N) and O-(2N).

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