polynomial_resultant


polynomial_resultant, a MATLAB code which computes the resultant R of univariate polynomials P and Q.

Licensing:

The computer code and data files described and made available on this web page are distributed under the MIT license.

Languages:

polynomial_resultant is available in a MATLAB version.

Related Data and Programs:

polynomial_resultant_test

polynomial_multiply, a MATLAB code which multiplies two polynomials p(x) and q(x).

polynomial_root_bound, a MATLAB code which computes the Cauchy bound on the magnitude of all roots of a polynomial with complex coefficients.

r8poly, a MATLAB code which contains a number of utilities for polynomials with R8 coefficients, that is, using double precision or 64 bit real arithmetic.

test_values, a MATLAB code which supplies test values of various mathematical functions, including Abramowitz, AGM, Airy, Bell, Bernoulli, Bessel, Beta, Binomial, Bivariate Normal, Catalan, Cauchy, Chebyshev, Chi Square, Clausen, Clebsch Gordan, Collatz, Cosine integral, Dawson, Debye, Dedekind, dilogarithm, Dixon elliptic functions, Exponential integral, Elliptic, Error, Euler, Exponential integral, F probability, Fresnel, Frobenius, Gamma, Gegenbauer, Goodwin, Gudermannian, Harmonic, Hermite, Hypergeometric 1F1, Hypergeometric 2F1, inverse trigonometic, Jacobi, Julian Ephemeris Date, Kelvin, Laguerre, Lambert W, Laplace, Legendre, Lerch, Lobachevsky, Lobatto, Logarithmic integral, Log normal, McNugget numbers, Mertens, Mittag-Leffler, Moebius, Multinomial, Negative binomial, Nine J, Normal, Omega, Owen, Partition, Phi, Pi, Poisson, Polylogarithm, Polynomial Resultant, Polyomino, Prime, Psi, Rayleigh, Hyperbolic Sine integral, Sigma, Sine Power integral, Sine integral, Six J, Sphere area, Sphere volume, Spherical harmonic, Stirling, Stromgen, Struve, Student, Subfactorial, Student probability, Three J, Transport, Trigamma, Truncated normal, van der Corput, von Mises, Weibull, Wright omega, Zeta.

Reference:

  1. Michael Pohst, Hans Zassenhaus,
    Algorithmic Algebraic Number Theory,
    Cambridge University Press, 1989
    LC: QA247.P58
    ISBN: 0-521-33060-2

Source Code:

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Last modified on 30 January 2024.