NAME
Math::Libgsl::Polynomial - An interface to libgsl, the Gnu Scientific Library - Polynomials.
SYNOPSIS
use Math::Libgsl::Raw::Polynomial :ALL;
use Math::Libgsl::Polynomial :ALL;
DESCRIPTION
Math::Libgsl provides an interface to polynomial evaluation in libgsl, the GNU Scientific Library.
Math::Libgsl::Polynomial makes these tags available:
:eval
:divdiff
:quad
:cubic
:complexsolve
sub poly-eval(Positional $c, Num(Cool) $x --> Num) is export(:eval)
Evaluates a polynomial with real coefficients for the real variable x.
my @c = 1, 2, 3;
say poly-eval(@c, 10); # prints 321
sub poly-eval-derivs(Num(Cool) $x, Int $maxn, Positional $c --> List) is export(:eval)
This function evaluates a polynomial and its derivatives. The output array contains the values of dⁿP(x)/dxⁿ for the specified value of x starting with n = 0.
sub poly-dd(Positional $xa, Positional $ya, Positional $x --> List) is export(:divdiff)
This function computes a divided-difference representation of the interpolating polynomial for the points (xa, ya) and evaluates the polynomial for each point x.
sub poly-dd-taylor(Positional $xa, Positional $ya, Num(Cool) $x --> List) is export(:divdiff)
This function converts the divided-difference representation of a polynomial to a Taylor expansion and evaluates the Taylor coefficients about the point x.
sub poly-dd-hermite(Positional $xa, Positional $ya, Positional $dya, Positional $x --> List) is export(:divdiff)
This function computes a divided-difference representation of the interpolating Hermite polynomial for the points (xa, ya) and evaluates the polynomial for each point x.
sub poly-solve-quadratic(Num(Cool) $a, Num(Cool) $b, Num(Cool) $c --> List) is export(:quad)
This function finds the real roots of the quadratic equation ax² + bx + c = 0. It returns a list of values: the number of the real roots found and zero, one or two roots; if present the roots are sorted in ascending order.
sub poly-complex-solve-quadratic(Num(Cool) $a, Num(Cool) $b, Num(Cool) $c --> List) is export(:quad)
This function finds the complex roots of the quadratic equation ax² + bx + c = 0. It returns a list of values: the number of the real roots found and zero, one or two roots. The root are returned as Raku Complex values.
sub poly-solve-cubic(Num(Cool) $a, Num(Cool) $b, Num(Cool) $c --> List) is export(:cubic)
This function finds the real roots of the cubic equation x³ + ax² + bx + c = 0. It returns a list of values: the number of the real roots found and one or three roots; the roots are sorted in ascending order.
sub poly-complex-solve-cubic(Num(Cool) $a, Num(Cool) $b, Num(Cool) $c --> List) is export(:cubic)
This function finds the complex roots of the cubic equation x³ + ax² + bx + c = 0. The number of complex roots is returned (always three); the roots are returned in ascending order, sorted first by their real components and then by their imaginary components. The root are returned as Raku Complex values.
sub poly-complex-solve(*@a --> List) is export(:complexsolve)
This function computes the roots of the general polynomial a₀ + a₁x + a₂x² + … + aₙ₋₁xⁿ⁻¹ The root are returned as Raku Complex values.
C Library Documentation
For more details on libgsl see https://www.gnu.org/software/gsl/. The excellent C Library manual is available here https://www.gnu.org/software/gsl/doc/html/index.html, or here https://www.gnu.org/software/gsl/doc/latex/gsl-ref.pdf in PDF format.
Prerequisites
This module requires the libgsl library to be installed. Please follow the instructions below based on your platform:
Debian Linux and Ubuntu 20.04
sudo apt install libgsl23 libgsl-dev libgslcblas0
That command will install libgslcblas0 as well, since it's used by the GSL.
Ubuntu 18.04
libgsl23 and libgslcblas0 have a missing symbol on Ubuntu 18.04. I solved the issue installing the Debian Buster version of those three libraries:
Installation
To install it using zef (a module management tool):
$ zef install Math::Libgsl::Polynomial
AUTHOR
Fernando Santagata nando.santagata@gmail.com
COPYRIGHT AND LICENSE
Copyright 2020 Fernando Santagata
This library is free software; you can redistribute it and/or modify it under the Artistic License 2.0.