for p = 2 and p = 1. Let \xi_n be the zeros of the orthogonal polynomial p_n(x) of degree n corresponding to the weight function w(x) \geq \mu > 0. Then (*) holds with p = 2. The same is true if we choose for \xi_n the zeros of p_n(x)+A_np_n-1(x)+B_np_n-2(x), where A_n arbitrary real, B_n \leq 0. If int_-1⁺¹ w(x) dx and int_-1⁺¹ w(x)^-1\, dx exist and \xi_n is defined by the zeros of the linear combination mentioned, (*) holds with p = 1. Finally the existence of a continous function f(x) is proved for which (*) with p = 2 does not hold provided that sum_{k = 1}ⁿ int_-1⁺¹ l_k(x)² \, dx is unbounded; here l_k(x) are the fundamental polynomials of the Lagrange interpolation corresponding to the set \xi_n.
Reviewer:  G.Szegö
Classif.:  * 41A05 Interpolation
                   42A15 Trigonometric interpolation
Index Words:  Approximation of functions, orthogonal series developments

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