Blumenthal's Theorem for Laurent Orthogonal Polynomials

A well-known theorem by \(\mathrm{N}\). Wiener characterizes the discrete part of a complex Borel measure \(\mu \in \mathbf{M}(T)\) on the torus group \(T\). In this note an analoguous result is presented for orthonormal polynomial sequences \(\left(p_{n}\right)_{n \in n_{0}}\). For Jacobi polynomia

In this paper, some important properties of orthogonal polynomials of two variables are investigated. The concepts of invariant factor for orthogonal polynomials of two variables are introduced. The presented results include Stieltjies type theorems for multivariate orthogonal polynomials and the co

The set P of all probability measures s on the unit circle T splits into three disjoint subsets depending on properties of the derived set of {|j n | 2 ds} n \ 0 , denoted by Lim(s). Here {j n } n \ 0 are orthogonal polynomials in L 2 (ds). The first subset is the set of Rakhmanov measures, i.e., of

The strong Chebyshev distribution and the Chebyshev orthogonal Laurent polynomials are examined in detail. Explicit formulas are derived for the orthogonal Laurent polynomials, uniform convergence of the associated continued fraction is established, and the zeros of the Chebyshev L-polynomials are g