Szego-type asymptotics for ray sequences of Frobenius-Pad\'e approximants

Abstract

Let σ be a Cauchy transform of a possibly complex-valued Borel measure σ and \pn\ be a system of orthonormal polynomials with respect to a measure μ, supp(μ)(σ)=. An (m,n)-th Frobenius-Pad\'e approximant to σ is a rational function P/Q, deg(P)≤ m, deg(Q)≤ n, such that the first m+n+1 Fourier coefficients of the linear form Qσ-P vanish when the form is developed into a series with respect to the polynomials pn. We investigate the convergence of the Frobenius-Pad\'e approximants to σ along ray sequences nn+m+1 c>0, n-1≤ m, when μ and σ are supported on intervals on the real line and their Radon-Nikodym derivatives with respect to the arcsine distribution of the respective interval are holomorphic functions.