Journal of Research of the National Bureau of Standards

Topics: Bernstein polynomials, bounds, polynomials

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Jul 29, 2022
07/22

by
Khovanskiĭ, A. G

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viii, 139 p. : 27 cm

Topic: Polynomials

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42

Aug 9, 2019
08/19

by
Schinzel, Andrzej

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x, 558 p. ; 25 cm

Topic: Polynomials

Source: removedNEL

Bibliography: p. 24

Topic: Polynomials

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Apr 20, 2022
04/22

by
El Attar, Refaat A

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95 pages ; 26 cm

Topics: Legendre's polynomials, Legendre's functions, Polynomials

The Discrete Logarithm Problem (DLP) is a fundamental cryptographic primitive. The DLP is defined for any cyclic group, specifically finite fields, whether the integers modulo a prime p or a polynomial field of characteristic p modulo some irreducible polynomial f(x). For polynomial fields over a finite field, also known as Galois fields, the DLP can be viewed as finding a solution to the equation 1 + x(i) = x(j) for arbitrary values of i (modulo some primitive polynomial). Solutions are...

Topics: Polynomials, Algorithms

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Sep 24, 2010
09/10

by
Sasuly, Max, 1888-1971; Brookings Institution

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Includes bibliographical references

Topics: Statistics, Polynomials

14

Topic: Lamé polynomials

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Apr 21, 2021
04/21

by
Farahmand, Kambiz

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163 pages : 25 cm

Topics: Random polynomials, Polynomen, Polynomials, Polynômes orthogonaux

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Jul 22, 2021
07/21

by
Thangavelu, Sundaram

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xv, 195 p. : 24 cm

Topics: Hermite polynomials, Laguerre polynomials, Representations of groups

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Aug 8, 2019
08/19

by
Suetin, P. K. (Pavel Kondratʹevich)

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xx, 348 p. : 26 cm

Topic: Orthogonal polynomials

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Aug 22, 2008
08/08

by
Kaufman, G. M

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Bibliography: leaf 30

Topic: Zonal polynomials

"Supported in part by the National Science Foundation under Grant no. NSF-GP-4636."

Topics: Algebra, Polynomials

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vii, 235 p. : 25 cm

Topic: Polynomials -- Congresses

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Aug 31, 2019
08/19

by
Lorentz, G. G

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130 p. :

Topic: Bernstein polynomials

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Jul 17, 2019
07/19

by
Stahl, Herbert

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xii, 250 p. ; 24 cm

Topic: Orthogonal polynomials

Source: removedNEL

"C00-1469-0150"

Topic: Jacobi polynomials

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Jan 2, 2020
01/20

by
Narkiewicz, Władysław

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130 p. : 24 cm

Topics: Polynomials, Mappings (Mathematics)

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Mar 31, 2022
03/22

by
Németh, Géza

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vii, 188 pages : 23 cm

Topics: Chebyshev polynomials, Orthogonal polynomials, Approximation theory, Aufsatzsammlung,...

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Jun 24, 2020
06/20

by
Gohberg, I. (Israel), 1928-2009, author

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xiv, 409 pages ; 24 cm

Topics: Matrices, Polynomials, Polynômes

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web

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Factoring Polynomials dumped with WikiTeam tools.

Topics: wiki, wikiteam, wikispaces, Factoring Polynomials, factoring-polynomials,...

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55 pages

Topics: Approximation theory, Polynomials

Journal of Research of the National Bureau of Standards

Topics: Markoff inequalities, polynomials

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Jul 31, 2019
07/19

by
Feinerman, Robert P

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viii, 148 p.; 24 cm

Topics: Approximation theory, Polynomials

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Apr 27, 2019
04/19

by
Ibadur Rahman

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p. cm

Topics: Functional analysis, Polynomials

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Jul 20, 2022
07/22

by
Lomont, John S., 1924-

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xxiii, 289 p. ; 25 cm

Topics: Elliptic functions, Polynomials

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Oct 9, 2020
10/20

by
Ferguson, Le Baron O., 1939-

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xi, 160 p. ; 26 cm

Topics: Approximation theory, Polynomials

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Jul 24, 2022
07/22

by
Lausch, Hans

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xi, 322 pages 23 cm

Topics: Algebra, Universal, Polynomials, Polynômes, Algèbre universelle, Polynom, Algebra Polynomials

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Sep 2, 2019
09/19

by
Borwein, Peter B

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x, 480 p. ; 25 cm

Topics: Inequalities (Mathematics), Polynomials

Folkscanomy Miscellaneous

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Dec 30, 2015
12/15

by
Koelink, Erik, 1964-; Assche, Walter van, 1958-

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Orthogonal Polynomials and Special Functions: Leuven 2002 Author: Erik Koelink, Walter Van Assche Published by Springer Berlin Heidelberg ISBN: 978-3-540-40375-3 DOI: 10.1007/b12166 Table of Contents: Computer Algebra Algorithms for Orthogonal Polynomials and Special Functions 3nj-Coefficients and Orthogonal Polynomials of Hypergeometric Type Dunkl Operators: Theory and Applications Enumeration and Special Functions Riemann-Hilbert Analysis for Orthogonal Polynomials Exponential Asymptotics

Topics: Orthogonal polynomials, Functions, Special

Multivariate Polynomial Approximation Author: Manfred Reimer Published by Birkhäuser Basel ISBN: 978-3-0348-9436-4 DOI: 10.1007/978-3-0348-8095-4 Table of Contents: Basic Principles and Facts Gegenbauer Polynomials Multivariate Polynomials Polynomials on Sphere and Ball Approximation Methods Approximation on the Sphere Approximation on the Ball Tomography

Topics: Approximation theory, Polynomials, Multivariate analysis, Approximation theory, Multivariate...

Journal of Research of the National Bureau of Standards

Topics: Polynomials, real parameter, zeros

University of Illinois Urbana-Champaign

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May 1, 2013
05/13

by
Plaisted, David A; University of Illinois at Urbana-Champaign. Department of Computer Science

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UIUCDCS-R-79-955

Topics: Propositional calculus, Polynomials, Inference

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112 pages : 24 cm

Topics: Calculus, Calculus, Integral, Polynomials

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vi, 170 p. : 26 cm

Topic: Orthogonal polynomials -- Asymptotic theory

University of Illinois Urbana-Champaign

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Apr 5, 2013
04/13

by
Descloux, J; University of Illinois (Urbana-Champaign campus). Digital Computer Laboratory; National Science Foundation (U.S.)

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Suppored by: National Science Foundation grant G16489

Topics: Chebyshev polynomials, Numerical analysis

The fundamental concept of orthogonality of mathematical objects occurs in a wide variety of physical and engineering disciplines. The theory of orthogonal functions, for example, is central to the development of Fourier series and wavelets, essential for signal processing. In particular, various families of classical orthogonal polynomials have traditionally been applied to fields such as electrostatics, numerical analysis, and many others. This thesis develops the main ideas necessary for...

Topics: Orthogonal polynomials, Hypergeometric series

A discussion of the problem of the irreducibility of polynomials in the ring of integral polynomials establishes the framework of the research. A transformational scheme is postulated to facilitate investigation of the problem. The coherency of the scheme is detailed and the necessary computational techniques developed. To determine the efficacy of the transformational scheme, the specification and collection of appropriate sets of data are discussed. The transformational scheme is then applied...

Topics: Computer science, Irreducible polynomials

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Dec 21, 2009
12/09

by
Varga, Richard S

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Book digitized by Google from the library of Harvard University and uploaded to the Internet Archive by user tpb.

Topics: Interpolation, Approximation theory, Polynomials

Source: http://books.google.com/books?id=p3USAAAAYAAJ&oe=UTF-8

Thesis (M.A.)--University of Illinois, 1910

Topics: Curves, Plane, Polynomials, Theses

Folkscanomy Miscellaneous

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549

Dec 29, 2015
12/15

by
Mikhalev, Alexander A., 1965-; Shpilrain, Vladimir, 1960-; Yu, Jie-Tai

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Combinatorial Methods: Free Groups, Polynomials, and Free Algebras Author: Alexander A. Mikhalev, Vladimir Shpilrain, Jie-Tai Yu Published by Springer New York ISBN: 978-1-4419-2344-8 DOI: 10.1007/978-0-387-21724-6 Table of Contents: Introduction Classical Techniques of Combinatorial Group Theory Test Elements Other Special Elements Automorphic Orbits The Jacobian Conjecture The Cancellation Conjecture Nagata’s Problem The Embedding Problem Coordinate Polynomials Test Elements of Polynomial...

Topics: Combinatorial group theory, Lie algebras, Polynomials, Combinatorial group theory, Lie algebras,...

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Oct 7, 2015
10/15

by
Tovey, Craig A.

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Title from cover

Topic: ALGORITHMS.,MATHEMATICAL MODELS.,POLYNOMIALS.

Manuscript copy

Topics: Polynomials, Iterative methods (Mathematics)

Journal of Research of the National Bureau of Standards

Topics: Binomial coefficients, bounds, polynomials

Journal of Research of the National Bureau of Standards

Topics: Enestroem's theorem, polynomials, zeros

Primality Testing in Polynomial Time: From Randomized Algorithms to "PRIMES Is in P" Author: Martin Dietzfelbinger Published by Springer Berlin Heidelberg ISBN: 978-3-540-40344-9 DOI: 10.1007/b12334 Table of Contents: 1. Introduction: Efficient Primality Testing 2. Algorithms for Numbers and Their Complexity 3. Fundamentals from Number Theory 4. Basics from Algebra: Groups, Rings, and Fields 5. The Miller-Rabin Test 6. The Solovay-Strassen Test 7. More Algebra: Polynomials and Fields...

Topics: Polynomials, Numbers, Prime, Algorithms

Title from cover

Topics: ALGORITHMS., MATHEMATICAL MODELS., POLYNOMIALS.

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Jul 18, 2014
07/14

by
Szőkefalvi-Nagy, Béla, 1913-

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Translation of Valós függvények és függvénysorok

Topics: Functional analysis, Orthogonal polynomials

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Mar 21, 2013
03/13

by
Sewell, W. E. (Walter Edwin)

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1 online resource (ix, 236 pages)

Topics: Approximation theory, Polynomials, MATHEMATICS -- General