%perlcode %{
use Scalar::Util 'blessed';
use Math::GSL::Errno qw/$GSL_SUCCESS gsl_strerror/;
use Data::Dumper;
use strict;
use warnings;
use Carp qw/croak/;
use Scalar::Util 'blessed';
use overload
'*' => \&_multiplication,
'/' => \&_division,
'+' => \&_addition,
'-' => \&_subtract,
'==' => \&_equal,
'!=' => \&_not_equal,
fallback => 1;
our @EXPORT_OK = qw(
gsl_complex_arg gsl_complex_abs gsl_complex_rect gsl_complex_polar doubleArray_getitem
gsl_complex_rect gsl_complex_polar gsl_complex_arg gsl_complex_abs gsl_complex_abs2
gsl_complex_logabs gsl_complex_add gsl_complex_sub gsl_complex_mul gsl_complex_div
gsl_complex_add_real gsl_complex_sub_real gsl_complex_mul_real gsl_complex_div_real
gsl_complex_add_imag gsl_complex_sub_imag gsl_complex_mul_imag gsl_complex_div_imag
gsl_complex_conjugate gsl_complex_inverse gsl_complex_negative gsl_complex_sqrt
gsl_complex_sqrt_real gsl_complex_pow gsl_complex_pow_real gsl_complex_exp
gsl_complex_log gsl_complex_log10 gsl_complex_log_b gsl_complex_sin
gsl_complex_cos gsl_complex_sec gsl_complex_csc gsl_complex_tan
gsl_complex_cot gsl_complex_arcsin gsl_complex_arcsin_real gsl_complex_arccos
gsl_complex_arccos_real gsl_complex_arcsec gsl_complex_arcsec_real gsl_complex_arccsc
gsl_complex_arccsc_real gsl_complex_arctan gsl_complex_arccot gsl_complex_sinh
gsl_complex_cosh gsl_complex_sech gsl_complex_csch gsl_complex_tanh
gsl_complex_coth gsl_complex_arcsinh gsl_complex_arccosh gsl_complex_arccosh_real
gsl_complex_arcsech gsl_complex_arccsch gsl_complex_arctanh gsl_complex_arctanh_real
gsl_complex_arccoth new_doubleArray delete_doubleArray doubleArray_setitem
gsl_real gsl_imag gsl_parts
gsl_complex_eq gsl_set_real gsl_set_imag gsl_set_complex
$GSL_COMPLEX_ONE $GSL_COMPLEX_ZERO $GSL_COMPLEX_NEGONE
);
# macros to implement
# gsl_set_complex gsl_set_complex_packed
our ($GSL_COMPLEX_ONE, $GSL_COMPLEX_ZERO, $GSL_COMPLEX_NEGONE) = map { gsl_complex_rect($_, 0) } qw(1 0 -1);
our %EXPORT_TAGS = ( all => [ @EXPORT_OK ] );
=encoding utf8
=head2 copy()
Returns a copy of the Complex number, which resides at a different location in
memory.
my $z = Math::GSL::Complex->new([10,5]);
my $copy = $z->copy;
=cut
sub copy {
my $self = shift;
my $copy = Math::GSL::Complex->new(
gsl_real($self->raw), gsl_imag($self->raw)
);
return $copy;
}
sub _not_equal {
my ($left, $right) = @_;
return ! _equal($left, $right);
}
sub _equal {
my ($left, $right) = @_;
if ( blessed $right && $right->isa('Math::GSL::Complex') && blessed $left && $left->isa('Math::GSL::Complex') ) {
return gsl_complex_eq($left->raw, $right->raw);
} else {
# If both are not Complex objects, they can't be the same
return 0;
}
}
sub _division {
my ($left, $right) = @_;
my $raw;
if ( blessed $right && $right->isa('Math::GSL::Complex') && blessed $left && $left->isa('Math::GSL::Complex') ) {
my $rcopy = $right->copy;
$raw = gsl_complex_div($left->raw, $right->raw);
$rcopy->set_raw( $raw );
return $rcopy;
} else {
my $lcopy = $left->copy;
$raw = gsl_complex_div_real($lcopy->raw, $right);
$lcopy->set_raw($raw);
return $lcopy;
}
}
sub _multiplication {
my ($left, $right) = @_;
my $raw;
if ( blessed $right && $right->isa('Math::GSL::Complex') && blessed $left && $left->isa('Math::GSL::Complex') ) {
my $rcopy = $right->copy;
$raw = gsl_complex_mul($left->raw, $right->raw);
$rcopy->set_raw( $raw );
return $rcopy;
} else {
my $lcopy = $left->copy;
$raw = gsl_complex_mul_real($lcopy->raw, $right);
$lcopy->set_raw($raw);
return $lcopy;
}
}
sub _subtract {
my ($left, $right) = @_;
my $rcopy = $right->copy;
my $raw = gsl_complex_negative($right->raw);
$rcopy->set_raw($raw);
return _addition($left, $rcopy);
}
sub _addition {
my ($left, $right) = @_;
my $lcopy = $left->copy;
my $raw;
if ( blessed $right && $right->isa('Math::GSL::Complex') && blessed $left && $left->isa('Math::GSL::Complex') ) {
$raw = gsl_complex_add($lcopy->raw, $right->raw);
} else {
$raw = gsl_complex_add_constant($lcopy->raw, $right);
}
$lcopy->set_raw($raw);
return $lcopy;
}
sub set_raw {
my ($self, $raw) = @_;
$self->{_complex} = $raw;
return $self;
}
sub new {
my ($class, @values) = @_;
my $this = {};
$this->{_complex} = gsl_complex_rect($values[0], $values[1]);
bless $this, $class;
}
sub real {
my ($self) = @_;
gsl_real($self->raw);
}
sub imag {
my ($self) = @_;
gsl_imag($self->raw);
}
sub parts {
my ($self) = @_;
gsl_parts($self->raw);
}
sub raw { (shift)->{_complex} }
### some important macros that are in gsl_complex.h
sub gsl_complex_eq {
my ($z,$w) = @_;
gsl_real($z) == gsl_real($w) && gsl_imag($z) == gsl_imag($w) ? 1 : 0;
}
sub gsl_set_real {
my ($z,$r) = @_;
doubleArray_setitem($z->{dat}, 0, $r);
}
sub gsl_set_imag {
my ($z,$i) = @_;
doubleArray_setitem($z->{dat}, 1, $i);
}
sub gsl_real {
my $z = shift;
return doubleArray_getitem($z->{dat}, 0 );
}
sub gsl_imag {
my $z = shift;
return doubleArray_getitem($z->{dat}, 1 );
}
sub gsl_parts {
my $z = shift;
return (gsl_real($z), gsl_imag($z));
}
sub gsl_set_complex {
my ($z, $r, $i) = @_;
gsl_set_real($z, $r);
gsl_set_imag($z, $i);
}
=head1 NAME
Math::GSL::Complex - Complex Numbers
=head1 SYNOPSIS
use Math::GSL::Complex qw/:all/;
my $complex = Math::GSL::Complex->new([3,2]); # creates a complex number 3+2*i
my $real = $complex->real; # returns the real part
my $imag = $complex->imag; # returns the imaginary part
$complex->gsl_set_real(5); # changes the real part to 5
$complex->gsl_set_imag(4); # changes the imaginary part to 4
$complex->gsl_set_complex(7,6); # changes it to 7 + 6*i
($real, $imag) = $complex->parts; # get both at once
=head1 DESCRIPTION
Here is a list of all the functions included in this module :
=over 1
=item C<gsl_complex_arg($z)>
Return the argument of the complex number $z
=item C<gsl_complex_abs($z)>
Return |$z|, the magnitude of the complex number $z
=item C<gsl_complex_rect($x,$y)>
Create a complex number in cartesian form $x + $y*i
=item C<gsl_complex_polar($r,$theta)>
Create a complex number in polar form $r*exp(i*$theta)
=item C<gsl_complex_abs2($z)>
Return |$z|^2, the squared magnitude of the complex number $z
=item C<gsl_complex_logabs($z)>
Return log(|$z|), the natural logarithm of the magnitude of the complex number $z
=item C<gsl_complex_add($c1, $c2)>
Return a complex number which is the sum of the complex numbers $c1 and $c2
=item C<gsl_complex_sub($c1, $c2)>
Return a complex number which is the difference between $c1 and $c2 ($c1 - $c2)
=item C<gsl_complex_mul($c1, $c2)>
Return a complex number which is the product of the complex numbers $c1 and $c2
=item C<gsl_complex_div($c1, $c2)>
Return a complex number which is the quotient of the complex numbers $c1 and $c2 ($c1 / $c2)
=item C<gsl_complex_add_real($c, $x)>
Return the sum of the complex number $c and the real number $x
=item C<gsl_complex_sub_real($c, $x)>
Return the difference of the complex number $c and the real number $x
=item C<gsl_complex_mul_real($c, $x)>
Return the product of the complex number $c and the real number $x
=item C<gsl_complex_div_real($c, $x)>
Return the quotient of the complex number $c and the real number $x
=item C<gsl_complex_add_imag($c, $y)>
Return sum of the complex number $c and the imaginary number i*$x
=item C<gsl_complex_sub_imag($c, $y)>
Return the diffrence of the complex number $c and the imaginary number i*$x
=item C<gsl_complex_mul_imag($c, $y)>
Return the product of the complex number $c and the imaginary number i*$x
=item C<gsl_complex_div_imag($c, $y)>
Return the quotient of the complex number $c and the imaginary number i*$x
=item C<gsl_complex_conjugate($c)>
Return the conjugate of the of the complex number $c (x - i*y)
=item C<gsl_complex_inverse($c)>
Return the inverse, or reciprocal of the complex number $c (1/$c)
=item C<gsl_complex_negative($c)>
Return the negative of the complex number $c (-x -i*y)
=item C<gsl_complex_sqrt($c)>
Return the square root of the complex number $c
=item C<gsl_complex_sqrt_real($x)>
Return the complex square root of the real number $x, where $x may be negative
=item C<gsl_complex_pow($c1, $c2)>
Return the complex number $c1 raised to the complex power $c2
=item C<gsl_complex_pow_real($c, $x)>
Return the complex number raised to the real power $x
=item C<gsl_complex_exp($c)>
Return the complex exponential of the complex number $c
=item C<gsl_complex_log($c)>
Return the complex natural logarithm (base e) of the complex number $c
=item C<gsl_complex_log10($c)>
Return the complex base-10 logarithm of the complex number $c
=item C<gsl_complex_log_b($c, $b)>
Return the complex base-$b of the complex number $c
=item C<gsl_complex_sin($c)>
Return the complex sine of the complex number $c
=item C<gsl_complex_cos($c)>
Return the complex cosine of the complex number $c
=item C<gsl_complex_sec($c)>
Return the complex secant of the complex number $c
=item C<gsl_complex_csc($c)>
Return the complex cosecant of the complex number $c
=item C<gsl_complex_tan($c)>
Return the complex tangent of the complex number $c
=item C<gsl_complex_cot($c)>
Return the complex cotangent of the complex number $c
=item C<gsl_complex_arcsin($c)>
Return the complex arcsine of the complex number $c
=item C<gsl_complex_arcsin_real($x)>
Return the complex arcsine of the real number $x
=item C<gsl_complex_arccos($c)>
Return the complex arccosine of the complex number $c
=item C<gsl_complex_arccos_real($x)>
Return the complex arccosine of the real number $x
=item C<gsl_complex_arcsec($c)>
Return the complex arcsecant of the complex number $c
=item C<gsl_complex_arcsec_real($x)>
Return the complex arcsecant of the real number $x
=item C<gsl_complex_arccsc($c)>
Return the complex arccosecant of the complex number $c
=item C<gsl_complex_arccsc_real($x)>
Return the complex arccosecant of the real number $x
=item C<gsl_complex_arctan($c)>
Return the complex arctangent of the complex number $c
=item C<gsl_complex_arccot($c)>
Return the complex arccotangent of the complex number $c
=item C<gsl_complex_sinh($c)>
Return the complex hyperbolic sine of the complex number $c
=item C<gsl_complex_cosh($c)>
Return the complex hyperbolic cosine of the complex number $cy
=item C<gsl_complex_sech($c)>
Return the complex hyperbolic secant of the complex number $c
=item C<gsl_complex_csch($c)>
Return the complex hyperbolic cosecant of the complex number $c
=item C<gsl_complex_tanh($c)>
Return the complex hyperbolic tangent of the complex number $c
=item C<gsl_complex_coth($c)>
Return the complex hyperbolic cotangent of the complex number $c
=item C<gsl_complex_arcsinh($c)>
Return the complex hyperbolic arcsine of the complex number $c
=item C<gsl_complex_arccosh($c)>
Return the complex hyperbolic arccosine of the complex number $c
=item C<gsl_complex_arccosh_real($x)>
Return the complex hyperbolic arccosine of the real number $x
=item C<gsl_complex_arcsech($c)>
Return the complex hyperbolic arcsecant of the complex number $c
=item C<gsl_complex_arccsch($c)>
Return the complex hyperbolic arccosecant of the complex number $c
=item C<gsl_complex_arctanh($c)>
Return the complex hyperbolic arctangent of the complex number $c
=item C<gsl_complex_arctanh_real($x)>
Return the complex hyperbolic arctangent of the real number $x
=item C<gsl_complex_arccoth($c)>
Return the complex hyperbolic arccotangent of the complex number $c
=item C<gsl_real($z)>
Return the real part of $z
=item C<gsl_imag($z)>
Return the imaginary part of $z
=item C<gsl_parts($z)>
Return a list of the real and imaginary parts of $z
=item C<gsl_set_real($z, $x)>
Sets the real part of $z to $x
=item C<gsl_set_imag($z, $y)>
Sets the imaginary part of $z to $y
=item C<gsl_set_complex($z, $x, $h)>
Sets the real part of $z to $x and the imaginary part to $y
=back
=head1 EXAMPLES
This code defines $z as 6 + 4*i, takes the complex conjugate of that number, then prints it out.
=over 1
my $z = gsl_complex_rect(6,4);
my $y = gsl_complex_conjugate($z);
my ($real, $imag) = gsl_parts($y);
print "z = $real + $imag*i\n";
=back
This code defines $z as 5 + 3*i, multiplies it by 2 and then prints it out.
=over 1
my $x = gsl_complex_rect(5,3);
my $z = gsl_complex_mul_real($x, 2);
my $real = gsl_real($z);
my $imag = gsl_imag($z);
print "Re(\$z) = $real\n";
=back
=head1 AUTHORS
Jonathan "Duke" Leto <jonathan@leto.net> and Thierry Moisan <thierry.moisan@gmail.com>
=head1 COPYRIGHT AND LICENSE
Copyright (C) 2008-2014 Jonathan "Duke" Leto and Thierry Moisan
This program is free software; you can redistribute it and/or modify it
under the same terms as Perl itself.
=cut
%}