AbstractLet dμ be a probability measure on the unit circle and dν be the measure formed by adding a pure point to dμ. We give a formula for the Verblunsky coefficients of dν, based on a result of Simon
AbstractWe introduce the error-sum function of Lüroth series. Some elementary properties of this fun...
Purpose of the present paper is the study of probability measures on countable\footnote{ All the re...
Purpose of the present paper is the study of probability measures on countable\footnote{ All the re...
Let dμ be a probability measure on the unit circle and dν be the measure formed by adding a pure poi...
Let dμ be a probability measure on the unit circle and dν be the measure formed by adding a pure poi...
Let d μ be a probability measure on the unit circle and d ν be the measure formed by adding a pure...
Let d μ be a probability measure on the unit circle and d ν be the measure formed by adding a pure...
Given a probability measure μ supported on some compact set K ⊆ C and with orthonormal polynomials {...
Given a probability measure μ supported on some compact set K ⊆ C and with orthonormal polynomials {...
AbstractRelation between two sequences of orthogonal polynomials, where the associated measures are ...
We prove a general result on equality of the weak limits of the zero counting measure, dνndνn, of or...
AbstractThe pointwise approximation properties of the MKZ–Bézier operators Mn,α(f,x) for α≥1 have be...
AbstractIn Schweiger (2003) [1], Fritz Schweiger introduced the algorithm of the generalized continu...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
AbstractWe introduce the error-sum function of Lüroth series. Some elementary properties of this fun...
Purpose of the present paper is the study of probability measures on countable\footnote{ All the re...
Purpose of the present paper is the study of probability measures on countable\footnote{ All the re...
Let dμ be a probability measure on the unit circle and dν be the measure formed by adding a pure poi...
Let dμ be a probability measure on the unit circle and dν be the measure formed by adding a pure poi...
Let d μ be a probability measure on the unit circle and d ν be the measure formed by adding a pure...
Let d μ be a probability measure on the unit circle and d ν be the measure formed by adding a pure...
Given a probability measure μ supported on some compact set K ⊆ C and with orthonormal polynomials {...
Given a probability measure μ supported on some compact set K ⊆ C and with orthonormal polynomials {...
AbstractRelation between two sequences of orthogonal polynomials, where the associated measures are ...
We prove a general result on equality of the weak limits of the zero counting measure, dνndνn, of or...
AbstractThe pointwise approximation properties of the MKZ–Bézier operators Mn,α(f,x) for α≥1 have be...
AbstractIn Schweiger (2003) [1], Fritz Schweiger introduced the algorithm of the generalized continu...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
We consider probability measures, dμ = w(θ)^(dθ)_(2π) + dμ_s, on the unit circle, ∂D, with Verblunsk...
AbstractWe introduce the error-sum function of Lüroth series. Some elementary properties of this fun...
Purpose of the present paper is the study of probability measures on countable\footnote{ All the re...
Purpose of the present paper is the study of probability measures on countable\footnote{ All the re...
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