On the convergence of averaging Hermite interpolators |
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Authors: | M. A. Botto |
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Affiliation: | College of Cape Breton, Sydney Campus, P.O. Box 760, Sydney, N. S. B1P 6J1 Canada |
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Abstract: | We investigate two sequences of polynomial operators, H2n − 2(A1,f; x) and H2n − 3(A2,f; x), of degrees 2n − 2 and 2n − 3, respectively, defined by interpolatory conditions similar to those of the classical Hermite-Féjer interpolators H2n − 1(f, x). If H2n − 2(A1,f; x) and H2n − 3(A2,f; x) are based on the zeros of the jacobi polynomials Pn(α,β)(x), their convergence behaviour is similar to that of H2n − 1(f;, x). If they are based on the zeros of (1 − x2)Tn − 2(x), their convergence behaviour is better, in some sense, than that of H2n − 1(f, x). |
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