Equidistribution of zeros of some polynomials related to cyclic functions

Abstract

In the study of the cyclicity of a function f in reproducing kernel Hilbert spaces an important role is played by sequences of polynomials \pn\n∈ N called optimal polynomial approximants (o.p.a.). For many such spaces and when the functions f generating those o.p.a. are polynomials without zeros inside the disk but with some zeros on its boundary, we find that the weakly asympotic distribution of the zeros of 1-pnf is the uniform measure on the unit circle.

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