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Source: The Open Library
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1Ordered cones and approximation
By Klaus Keimel
“Ordered cones and approximation” Metadata:
- Title: ➤ Ordered cones and approximation
- Author: Klaus Keimel
- Language: English
- Number of Pages: Median: 134
- Publisher: ➤ Springer-Verlag - Springer London, Limited
- Publish Date: 1992 - 2006
- Publish Location: New York - Berlin
“Ordered cones and approximation” Subjects and Themes:
- Subjects: ➤ Approximation theory - Cones (Operator theory) - Approximation - Konvexer Kegel - Cones (Theorie des operateurs) - Kegel - Approximation, Theorie de l' - Cone Nachbin - Approximationstheorie - Cone localement convexe - Approximation Korovkin - Positiver linearer Operator - Positiver Operator - Lokalkonvexer Raum - Operator theory - Mathematics - Global analysis (Mathematics)
Edition Identifiers:
- The Open Library ID: OL37149906M - OL1710156M
- Online Computer Library Center (OCLC) ID: 25631288
- Library of Congress Control Number (LCCN): 92012015
- All ISBNs: ➤ 3540470794 - 0387554459 - 9783540554455 - 9783540470793 - 3540554459 - 9780387554457
Access and General Info:
- First Year Published: 1992
- Is Full Text Available: No
- Is The Book Public: No
- Access Status: Unclassified
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Korovkin approximation
In mathematics the Korovkin approximation is a convergence statement in which the approximation of a function is given by a certain sequence of functions
Pavel Korovkin
and approximation properties of linear positive operators on spaces of continuous functions. The set of terms[which?] and Korovkin approximation are named
Bernstein polynomial
first used by Bernstein in a constructive proof of the Weierstrass approximation theorem. With the advent of computer graphics, Bernstein polynomials
Szász–Mirakyan operator
operators. Altomare, Francesco; Campiti, Michele (2011) [1994]. Korovkin-Type Approximation Theory and Its Applications. De Gruyter Studies in Mathematics
Multidimensional Chebyshev's inequality
Altomare, Francesco; Campiti, Michele (1994). De Gruyter (ed.). Korovkin-type Approximation Theory and Its Applications. p. 313. doi:10.1515/9783110884586