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Chebyshev polynomials - In mathematics the Chebyshev polynomials, named after Pafnuty Chebyshev (Пафнутий Чебышёв), are a sequence of orthogonal polynomials which are related to de Moivre's formula and which are easily defined recursively, like Fibonacci or Lucas numbers. One usually distinguishes between Chebyshev polynomials of the first kind which are denoted Tn and Chebyshev polynomials of the second kind which ...
Gegenbauer polynomials - In mathematics, Gegenbauer polynomials or ultraspherical polynomials are a class of orthogonal polynomials. They are named for Leopold Gegenbauer (1849-1903).
Zernike polynomials - In mathematics the Zernike polynomials, named after Frits Zernike, are a sequence of orthogonal polynomials which play an important role in geometrical optics.
Padovan polynomials - In mathematics, Padovan polynomials are a generalization of Padovan sequence numbers. These polynomials are defined by:
Does the Jones Polynomial Detect Unknottedness? - Research paper showing that any knot with trivial Jones polynomial must have at least 18 crossings. The number of different Alexander, Homfly and Jones polynomials for knots of up to 15 crossings is given.
Polynomial Toolbox - A package for polynomials, polynomial matrices and their application in systems, signals and control. [commercial]
History of Polynomial Equations - History of quartic, cubic, quantic and quintic polynomials and their solutions. Also contains online solver for the named polynomials.
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Polynomial - Polynomial Polynomials The theory of polynomials constitutes an essential part of university of algebra polynomial and calculus. Nevertheless, there ...
Polynomial Help - Polynomial Help Polynomials The theory of polynomials constitutes an essential part of university of algebra polynomial help and calculus. Nevertheless, ...
Polynomial Cyst - Polynomial Cyst Polynomials The theory of polynomials constitutes an essential part of university of algebra polynomial cyst and calculus. Nevertheless, ...
Dividing Polynomial - Dividing Polynomial Algebraic Topology Based on Knots by Jozef H. Przytycki, This invaluable book describes the idea of building an ... paper "Analysis situs" (1895), defined abstractly homology groups starting from formal linear combinations of simplices, choosing cycles dividing polynomial and dividing them by relations coming from boundaries. The present author repeats this construction in the case ...
Adding Polynomial - Adding Polynomial Trigonometry for Dummies A plain-English guide to the basics of trig From sines adding polynomial and cosines to logarithms, conic sections, adding polynomial and polynomials, this friendly guide takes the torture out ...
Orthogonal Polynomial - Orthogonal Polynomial Fourier Series and Orthogonal Polynomials Fourier Series orthogonal polynomial and Orthogonal Polynomials Classical and Quantum Orthogonal Polynomials in One Variable The first ...
Bernstein Polynomial - Bernstein Polynomial Theory of Approximation of Functions of a Real Variable by A. F. Timan, X Excellent graduate-level monograph investigates relationship between various structural properties of real functions bernstein polynomial and the character of possible approximations to them by polynomials bernstein polynomial and other functions of simple ...
Legendre Polynomial - Legendre Polynomial Introductory Applications of Partial Differential Equations: With Emphaisis on Wave... by G. L. Lamb, INTRODUCTORY APPLICATIONS OF PARTIAL DIFFERENTIAL EQUATIONS With Emphasis on Wave Propagation legendre polynomial and Diffusion This is the ideal text for students legendre polynomial and professionals who have some familiarity ...
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