POLYNOMIAL INTERPOLATION IN POINTS EQUIDISTRIBUTED ON THE UNIT CIRCLE

Abstract

Let Ln(f; z) be the polynomial of degree at most n-1 found by interpolation in the distinct points znk = ei nk, k = 1, ..., n, to a function f given on z = 1. It is known that a nece sary and sufficient condition that nlim Ln(f; z) = f(z), z 1, for all f analytic n z 1, is that nk be equidistributed on 0, 2 . In nonanalytic cases, convergence has been established when znk is an n-th root of unity, b t the behavior of Ln with other spacings of the interpolation points is not clear. It is here proved that if nk, k = 1, ..., n, are independent random variables each with a uniform probability distribution and if f satisfies certain mild smoothness restrictions on z = 1, then where Ln is found by interpolation to f in the random points znk = ei nk. A simple example is constructed involving an equidistributed sample seq ence nk for w ich Ln(f; z) diverges to infinity at each point z, z < 1, for at least one function f continuous on z 1. (Author)

Document Details

Document Type

Technical Report

Publication Date

Jul 25, 1961

Accession Number

AD0264052

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