On Some Convergence Properties of the Interpolation Polynomials
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It is well known that there exist continuous functions whose Lagrange interpolation polynomials taken at the roots of the Tchebycheff polynomials T„ (x) diverge everywhere in (-1, + 1) .' On the other hand a few years ago S . Bernstein proved the following result' : Let f(x) be any continuous function ; then to every c > 0 there exists a sequence of polynomials ~p„(x) where ~0 ,(x) is of degree n 1 and it coincides with f(x) at, at least n cn roots of T, (x) and gyp, (x) -p f( .c) uniformly in (-1, + 1) . Fejer proved the following theorem' : Let the fundamental points of the interpolation be a normal 4 point group