N-th order blending

Delvos, Franz-Jürgen; Posdorf, Horst

doi:10.1007/BFb0086564

Franz-Jürgen Delvos³ &
Horst Posdorf⁴

Part of the book series: Lecture Notes in Mathematics ((LNM,volume 571))

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Literature

AHLBERG, J.H., NILSON, E.N., WALSH, J.L.: The theory of splines and their applications. New York-London: Academic Press 1967
MATH Google Scholar
BARNHILL, R.E.: Blending function interpolation: Survey and new results. ISNM, 30, 43–90 (1976)
MathSciNet Google Scholar
DE BOOR, C., LYNCH, R.E.: On splines and their minimum properties. J.Math.Mech. 15, 953–989 (1966)
MathSciNet MATH Google Scholar
DAVIS, Ph.D.: Interpolation and approximation. New York: Blaisdell Publ. Comp. 1963
MATH Google Scholar
DELVOS, F.J., KÖSTERS, H.W.: On the variational characterization of bivariate interpolation methods. Math.Z. 145, 129–137 (1975)
Article MathSciNet MATH Google Scholar
DELVOS, F.J., POSDORF, H.: On optimal tensor product approximation. J.Approx.Theory (to appear)
Google Scholar
DELVOS, F.J., SCHEMPP, W.: Sard's method and the theory of spline systems. J.Approx.Theory 14, 230–243 (1975)
Article MathSciNet MATH Google Scholar
GORDON, W.J.: Distributive lattices and approximation of multivariate functions. In: Approximation with special emphasis on spline functions. (I.J. Schoenberg ed.) pp.223–277. New York-London. Academic Press 1969
Google Scholar
GORDON, W.J.: Blending-function methods of bivariate and multivariate interpolation and approximation. SIAM J. numer. Analysis 8, 159–177 (1973)
Google Scholar
RITTER, K.: Two dimensional spline functions and best approximation of linear functionals. J.Approx.Theory 3, 352–368 (1970)
Article MathSciNet MATH Google Scholar
SARD, A.: Linear approximation. Math.Surveys 9. Am. Math.Society, Providence, Rhode Island 1963
Google Scholar
SARD, A.: Approximation based on nonscalar observations. J.Approx.Theory 8, 315–334 (1973)
Article MathSciNet MATH Google Scholar
SCHOENBERG, I.J.: On best approximation of linear operators. Nederl.Akad.Wetensch.Proc.Ser. A 67, 155–163 (1964)
MathSciNet MATH Google Scholar

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Authors and Affiliations

Lehrstuhl für Mathematik I Gesamthochschule Siegen, Hölderlinstraße 3, D-5900, Siegen 21, Fed. Rep. of Germany
Dr. Franz-Jürgen Delvos
Rechenzentrum Ruhr-Universität Bochum, Universitätsstraße 150, D-4630, Bochum, Fed. Rep. of Germany
Dipl.-Math. Horst Posdorf

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Dr. Franz-Jürgen Delvos
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Dipl.-Math. Horst Posdorf
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Editors and Affiliations

Lehrstuhl für Mathematik I, Universität Siegen, Hülderlinstraße 3, 5900, Siegen 21, BRD
Walter Schempp
Mathematisches Institut, Universität Tübingen, Auf der Morgenstelle 10, 7400, TObingen 1, BRD
Karl Zeller

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Delvos, FJ., Posdorf, H. (1977). N-th order blending. In: Schempp, W., Zeller, K. (eds) Constructive Theory of Functions of Several Variables. Lecture Notes in Mathematics, vol 571. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0086564

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DOI: https://doi.org/10.1007/BFb0086564
Published: 02 October 2006
Publisher Name: Springer, Berlin, Heidelberg
Print ISBN: 978-3-540-08069-5
Online ISBN: 978-3-540-37496-1
eBook Packages: Springer Book Archive

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