CONVERGENCE OF COMPLEX LAGRANGE INTERPOLATION POLYNOMIALS WITH NODES LYING ON A PIECEWISE ANALYTIC JORDAN CURVE WITH CUSPS,

Abstract

Let the analytic and univalent function z = phi(w) map the exterior of absolute value of w = 1 onto the exterior region of a Jordan curve C, so that infinity (opposite pointed arrows) infinity, and let phi be extended so as to give a topological map of absolute value of w = 1 onto C. Let S sub n = (phi(exp 2 pi ik/(n + 1)); k = 0, 1, ..., n) and let f(z) be continuous on C. Let L sub n(f; z) be the polynomial of degree at most n which interpolates to f in the points S sub n. The problem with which this paper is basically concerned is that of proving that with certain restrictions on C which include rectifiability, the equation Lim as n approaches infinity (L sub n(f; z)) = 1/2 pi i the integral over C of the quantity (f(z prime)dz prime/(z prime - z)) holds for z epsilon Int C, and the limit is uniform on any compact subset of Int C.

Document Details

Document Type

Technical Report

Publication Date

Jan 01, 1967

Accession Number

AD0664083

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