Provided by: libmath-cephes-perl_0.5305-6build3_amd64 
NAME
Math::Cephes::Polynomial - Perl interface to the cephes math polynomial routines
SYNOPSIS
use Math::Cephes::Polynomial qw(poly);
# 'poly' is a shortcut for Math::Cephes::Polynomial->new
require Math::Cephes::Fraction; # if coefficients are fractions
require Math::Cephes::Complex; # if coefficients are complex
my $a = poly([1, 2, 3]); # a(x) = 1 + 2x + 3x^2
my $b = poly([4, 5, 6, 7]; # b(x) = 4 + 5x + 6x^2 + 7x^3
my $c = $a->add($b); # c(x) = 5 + 7x + 9x^2 + 7x^3
my $cc = $c->coef;
for (my $i=0; $i<4; $i++) {
print "term $i: $cc->[$i]\n";
}
my $x = 2;
my $r = $c->eval($x);
print "At x=$x, c(x) is $r\n";
my $u1 = Math::Cephes::Complex->new(2,1);
my $u2 = Math::Cephes::Complex->new(1,-3);
my $v1 = Math::Cephes::Complex->new(1,3);
my $v2 = Math::Cephes::Complex->new(2,4);
my $z1 = Math::Cephes::Polynomial->new([$u1, $u2]);
my $z2 = Math::Cephes::Polynomial->new([$v1, $v2]);
my $z3 = $z1->add($z2);
my $z3c = $z3->coef;
for (my $i=0; $i<2; $i++) {
print "term $i: real=$z3c->{r}->[$i], imag=$z3c->{i}->[$i]\n";
}
$r = $z3->eval($x);
print "At x=$x, z3(x) has real=", $r->r, " and imag=", $r->i, "\n";
my $a1 = Math::Cephes::Fraction->new(1,2);
my $a2 = Math::Cephes::Fraction->new(2,1);
my $b1 = Math::Cephes::Fraction->new(1,2);
my $b2 = Math::Cephes::Fraction->new(2,2);
my $f1 = Math::Cephes::Polynomial->new([$a1, $a2]);
my $f2 = Math::Cephes::Polynomial->new([$b1, $b2]);
my $f3 = $f1->add($f2);
my $f3c = $f3->coef;
for (my $i=0; $i<2; $i++) {
print "term $i: num=$f3c->{n}->[$i], den=$f3c->{d}->[$i]\n";
}
$r = $f3->eval($x);
print "At x=$x, f3(x) has num=", $r->n, " and den=", $r->d, "\n";
$r = $f3->eval($a1);
print "At x=", $a1->n, "/", $a1->d,
", f3(x) has num=", $r->n, " and den=", $r->d, "\n";
DESCRIPTION
This module is a layer on top of the basic routines in the cephes math library to handle polynomials. In
the following, a Math::Cephes::Polynomial object is created as
my $p = Math::Cephes::Polynomial->new($arr_ref);
where $arr_ref is a reference to an array which can consist of one of
• floating point numbers, for polynomials with floating point coefficients,
• Math::Cephes::Fraction or Math::Fraction objects, for polynomials with fractional coefficients,
• Math::Cephes::Complex or Math::Complex objects, for polynomials with complex coefficients,
The maximum degree of the polynomials handled is set by default to 256 - this can be changed by setting
$Math::Cephes::Polynomial::MAXPOL.
A copy of a Math::Cephes::Polynomial object may be done as
my $p_copy = $p->new();
and a string representation of the polynomial may be gotten through
print $p->as_string;
Methods
The following methods are available.
coef: get coefficients of the polynomial
SYNOPSIS:
my $c = $p->coef;
DESCRIPTION:
This returns an array reference containing the coefficients of the polynomial.
clr: set a polynomial identically equal to zero
SYNOPSIS:
$p->clr($n);
DESCRIPTION:
This sets the coefficients of the polynomial identically to 0, up to $p->[$n]. If $n is omitted, all
elements are set to 0.
add: add two polynomials
SYNOPSIS:
$c = $a->add($b);
DESCRIPTION:
This sets $c equal to $a + $b.
sub: subtract two polynomials
SYNOPSIS:
$c = $a->sub($b);
DESCRIPTION:
This sets $c equal to $a - $b.
mul: multiply two polynomials
SYNOPSIS:
$c = $a->mul($b);
DESCRIPTION:
This sets $c equal to $a * $b.
div: divide two polynomials
SYNOPSIS:
$c = $a->div($b);
DESCRIPTION:
This sets $c equal to $a / $b, expanded by a Taylor series. Accuracy is approximately equal to the
degree of the polynomial, with an internal limit of about 16.
sbt: change of variables
SYNOPSIS:
$c = $a->sbt($b);
DESCRIPTION:
If a(x) and b(x) are polynomials, then
c(x) = a(b(x))
is a polynomial found by substituting b(x) for x in a(x). This method is not available for
polynomials with complex coefficients.
eval: evaluate a polynomial
SYNOPSIS:
$s = $a->eval($x);
DESCRIPTION:
This evaluates the polynomial at the value $x. The returned value is of the same type as that used to
represent the coefficients of the polynomial.
sqt: square root of a polynomial
SYNOPSIS:
$b = $a->sqt();
DESCRIPTION:
This finds the square root of a polynomial, evaluated by a Taylor expansion. Accuracy is
approximately equal to the degree of the polynomial, with an internal limit of about 16. This method
is not available for polynomials with complex coefficients.
sin: sine of a polynomial
SYNOPSIS:
$b = $a->sin();
DESCRIPTION:
This finds the sine of a polynomial, evaluated by a Taylor expansion. Accuracy is approximately equal
to the degree of the polynomial, with an internal limit of about 16. This method is not available
for polynomials with complex coefficients.
cos: cosine of a polynomial
SYNOPSIS:
$b = $a->cos();
DESCRIPTION:
This finds the cosine of a polynomial, evaluated by a Taylor expansion. Accuracy is approximately
equal to the degree of the polynomial, with an internal limit of about 16. This method is not
available for polynomials with complex coefficients.
atn: arctangent of the ratio of two polynomials
SYNOPSIS:
$c = $a->atn($b);
DESCRIPTION:
This finds the arctangent of the ratio $a / $b of two polynomial, evaluated by a Taylor expansion.
Accuracy is approximately equal to the degree of the polynomial, with an internal limit of about 16.
This method is not available for polynomials with complex coefficients.
rts: roots of a polynomial
SYNOPSIS:
my $w = Math::Cephes::Polynomial->new([-2, 0, -1, 0, 1]);
my ($flag, $r) = $w->rts();
for (my $i=0; $i<4; $i++) {
print "Root $i has real=", $r->[$i]->r, " and imag=", $r->[$i]->i, "\n";
}
DESCRIPTION:
This finds the roots of a polynomial. $flag, if non-zero, indicates a failure of some kind. $roots in
an array reference of Math::Cephes::Complex objects holding the real and complex values of the roots
found. This method is not available for polynomials with complex coefficients.
ACCURACY:
Termination depends on evaluation of the polynomial at the trial values of the roots. The values of
multiple roots or of roots that are nearly equal may have poor relative accuracy after the first root
in the neighborhood has been found.
BUGS
Please report any to Randy Kobes <randy@theoryx5.uwinnipeg.ca>
COPYRIGHT
The C code for the Cephes Math Library is Copyright 1984, 1987, 1989, 2002 by Stephen L. Moshier, and is
available at http://www.netlib.org/cephes/. Direct inquiries to 30 Frost Street, Cambridge, MA 02140.
The perl interface is copyright 2000, 2002 by Randy Kobes. This library is free software; you can
redistribute it and/or modify it under the same terms as Perl itself.
perl v5.38.2 2024-03-31 Math::Cephes::Polynomial(3pm)