Approximationstheorie
Approximationstheorie
Approximationstheorie
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LITERATUR 185<br />
[62] T. J. Ransford. A short elementary proof of the Bishop–Stone–Weierstrass theorem. Math.<br />
Proc. Camb. Phil. Soc., 96 (1984), 309–311.<br />
[63] T. J. Rivlin and H. S. Shapiro. A unified approach to certain problems of approximation<br />
and minimization. J. Soc. Indust. and Appl. Math., 9 (1961), 670–699.<br />
[64] T. Sauer. Multivariate Bernstein polynomials and convexity. Comp. Aided Geom. Design,<br />
8 (1991), 465–478.<br />
[65] T. Sauer. Note: On a maximum principle for Bernstein polynomials. J. Approx. Theory,<br />
71 (1992), 121–122.<br />
[66] T. Sauer. Axial convexity – a well shaped shape property. In P.-J. Laurent, A. Le Méhauté,<br />
and L. L. Schumaker, editors, Curves and Surfaces in Geometric Design, pages 419–425.<br />
A K Peters, 1994.<br />
[67] T. Sauer. Axially parallel subsimplices and convexity. Comp. Aided Geom. Design,<br />
12 (1995), 491–505.<br />
[68] T. Sauer. Multivariate Bernstein polynomials, convexity and related shape properties. In<br />
J. M. Pena, editor, Shape preserving representations in Computer Aided Design. Nova<br />
Science Publishers, 1999.<br />
[69] T. Sauer. Numerische Mathematik I. Vorlesungsskript, Friedrich–Alexander–<br />
Universität Erlangen–Nürnberg, Justus–Liebig–Universität Gießen, 2000.<br />
http://www.math.uni-giessen.de/tomas.sauer.<br />
[70] T. Sauer. Optimierung. Vorlesungsskript, Justus–Liebig–Universität Gießen, 2002.<br />
http://www.math.uni-giessen.de/tomas.sauer.<br />
[71] T. Sauer. Digitale Signalverarbeitung. Vorlesungsskript, Justus–Liebig–Universität Gießen,<br />
2003. http://www.math.uni-giessen.de/tomas.sauer.<br />
[72] T. Sauer. Kettenbrüche und Approximation. Vorlesungsskript, Justus–Liebig–Universität<br />
Gießen, 2005. http://www.math.uni-giessen.de/tomas.sauer.<br />
[73] H. J. Schmid. Bernsteinpolynome. Manuscript, 1975.<br />
[74] I. J. Schoenberg. Contributions to the problem of approximation of equidistant data by<br />
analytic functions. part B. – on the second problem of osculatory interpolation. a second<br />
class of analytic approximation formulae. Quart. Appl. Math., 4 (1949), 112–141.<br />
[75] L. G. ˇSnirel’man. On uniform approximations. Izv. Akad. Nauk. SSSR, Ser. Mat.,<br />
2 (1938), 53–59. In Russian, French Abstract, pp. 59–60.<br />
[76] D. A. Sprecher. On the structure of continuous functions of several variables. Trans. Amer.<br />
Math. Soc., 115 (1965), 340–355.