Asymptotics of orthogonal polynomials with respect to an analytic weight with algebraic singularities on the circle

Abstract

Strong asymptotics of polynomials orthogonal on the unit circle with respect to a weight of the form W(z) = w(z) Πk=1m |z-ak|2βk, |z|=1, |ak|=1, βk>-1/2, k=1, ..., m, where w(z)>0 for |z|=1 and can be extended as a holomorphic and non-vanishing function to an annulus containing the unit circle. The formulas obtained are valid uniformly in the whole complex plane. As a consequence, we obtain some results about the distribution of zeros of these polynomials, the behavior of their leading and Verblunsky coefficients, as well as give an alternative proof of the Fisher-Hartwig conjecture about the asymptotics of Toeplitz determinants for such type of weights. The main technique is the steepest descent analysis of Deift and Zhou, based on the matrix Riemann-Hilbert characterization proposed by Fokas, Its and Kitaev.

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