On a density problem related to a theorem of Szego

Abstract

A classical theorem of Szego states that for any probability measure μ=wdθ2π+μs on the unit circle the polynomials are dense in L2(T,μ) if and only if (w) L1(T). A related question asks whether the monomials with exponents in some subset ⊂eq N0 already span L2(T,μ) if (w) L1(T). A result by Olevskii and Ulanovskii gives an answer if μ belongs to a class of absolutely continuous measures. We investigate the same question for Markoff measures.

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