Next-To-Interpolatory Approximation on Sets with Multiplicities
Canadian journal of mathematics, Tome 18 (1966) no. 1, pp. 1196-1211
Voir la notice de l'article provenant de la source Cambridge University Press
It is known that given a set X of m (⩾n) distinct real numbers and a real-valued function f denned on X, there exists a unique polynomial pn-1,f,x of degree n — 1 or less which approximates best to f(x) on X, that is, which minimizes the deviation δ = δ(f, p) defined by the αth-power metric (α < 1) with positive weights, or by the positively weighted maximum of |f — p| on X; these deviations shall be denoted by δα and δβ. The polynomial pn-1,f,x has the property that f — pn-1,f,x has at least n strong sign changes; in other words, there are at least n + 1 points in X where the difference takes alternatingly positive and negative values.
Motzkin, T. S.; Sharma, A. Next-To-Interpolatory Approximation on Sets with Multiplicities. Canadian journal of mathematics, Tome 18 (1966) no. 1, pp. 1196-1211. doi: 10.4153/CJM-1966-118-7
@article{10_4153_CJM_1966_118_7,
author = {Motzkin, T. S. and Sharma, A.},
title = {Next-To-Interpolatory {Approximation} on {Sets} with {Multiplicities}},
journal = {Canadian journal of mathematics},
pages = {1196--1211},
year = {1966},
volume = {18},
number = {1},
doi = {10.4153/CJM-1966-118-7},
url = {http://geodesic.mathdoc.fr/articles/10.4153/CJM-1966-118-7/}
}
TY - JOUR AU - Motzkin, T. S. AU - Sharma, A. TI - Next-To-Interpolatory Approximation on Sets with Multiplicities JO - Canadian journal of mathematics PY - 1966 SP - 1196 EP - 1211 VL - 18 IS - 1 UR - http://geodesic.mathdoc.fr/articles/10.4153/CJM-1966-118-7/ DO - 10.4153/CJM-1966-118-7 ID - 10_4153_CJM_1966_118_7 ER -
[1] 1. Davis, P. J., Interpolation and approximation (New York, 1963). Google Scholar
[2] 2. de La Vallée Poussin, Ch.-J., Leçons sur Vapproximation des fonctions d'une variable réelle (Paris, 1919, reprinted 1952). Google Scholar
[3] 3. Stiefel, E. L., Numerical methods of Tchebycheff approximations, in On numerical approximation (Madison, 1959). pp. 217–232. Google Scholar
[4] 4. Szegö, G., Orthogonal polynomials (New York, 1939, revised edition 1959). Google Scholar
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