Para-orthogonal polynomials on the unit circle generated by Kronecker polynomials

Abstract

The Kronecker polynomial K(z) is a finite product of cyclotomic polynomials Cj(z). Any Kronecker polynomial K(z) of degree N+1 with simple roots on the unit circle generates a finite set 0=1, 1(z), …, N(z) of polynomials (para) orthogonal on the unit circle (POPUC). This set is determined uniquely by the condition N(z) = (N+1)-1 K'(z). Such set can be called the set of Sturmian Kronecker POPUC. We present several new explicit examples of such POPUC. In particular, we define and analyze properties of the Sturmian cyclotomic POPUC generated by the cyclotomic polynomials CM(z). Expressions of these polynomials strongly depend on the decomposition of M into prime factors.