On recurrence coefficients of Steklov measures
Abstract
A measure μ on the unit circle T belongs to Steklov class S if its density w with respect to the Lebesgue measure on T is strictly positive: ∈fT w > 0. Let μ, μ-1 be measures on the unit circle T with real recurrence coefficients \αk\, \-αk\, correspondingly. If μ ∈ S and μ-1 ∈ S, then partial sums sk=α0+ … + αk satisfy the discrete Muckenhoupt condition n > 0 (1n - Σk=n-1 e2sk)(1n - Σk=n-1 e-2sk) < ∞.
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