Revisiting mean-square approximation by polynomials in the unit disk

Abstract

For a positive finite Borel measure μ compactly supported in the complex plane, the space P2(μ) is the closure of the analytic polynomials in the Lebesgue space L2(μ). According to Thomson's famous result, any space P2(μ) decomposes as an orthogonal sum of pieces which are essentially analytic, and a residual L2-space. We study the structure of this decomposition for a class of Borel measures μ supported on the closed unit disk for which the part μD, living in the open disk D, is radial and decreases at least exponentially fast near the boundary of the disk. For the considered class of measures, we give a precise form of the Thomson decompsition. In particular, we confirm a conjecture of Kriete and MacCluer from 1990, which gives an analog to Szeg\"o's classical theorem.