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order_factorization_method.pl
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order_factorization_method.pl
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#!/usr/bin/perl
# Author: Daniel "Trizen" Șuteu
# Date: 02 August 2020
# Edit: 07 January 2021
# https://github.com/trizen
# A new factorization method for numbers that have all prime factors close to each other.
# Inpsired by Fermat's Little Theorem (FLT).
use 5.020;
use warnings;
use experimental qw(signatures);
use Math::GMPz;
sub FLT_find_factor ($n, $base = 2, $reps = 1e5) {
$n = Math::GMPz->new("$n");
state $z = Math::GMPz::Rmpz_init_nobless();
state $t = Math::GMPz::Rmpz_init_nobless();
my $g = Math::GMPz::Rmpz_init();
Math::GMPz::Rmpz_set_ui($t, $base);
Math::GMPz::Rmpz_set_ui($z, $base);
Math::GMPz::Rmpz_powm($z, $z, $n, $n);
# Cannot factor Fermat pseudoprimes
if (Math::GMPz::Rmpz_cmp_ui($z, $base) == 0) {
return undef;
}
my $multiplier = $base * $base;
for (my $k = 1 ; $k <= $reps ; ++$k) {
Math::GMPz::Rmpz_mul_ui($t, $t, $multiplier);
Math::GMPz::Rmpz_mod($t, $t, $n) if ($k % 10 == 0);
Math::GMPz::Rmpz_sub($g, $z, $t);
Math::GMPz::Rmpz_gcd($g, $g, $n);
if (Math::GMPz::Rmpz_cmp_ui($g, 1) > 0) {
return undef if (Math::GMPz::Rmpz_cmp($g, $n) == 0);
return $g;
}
}
return undef;
}
say FLT_find_factor("1759590140239532167230871849749630652332178307219845847129"); #=> 12072684186515582507
say FLT_find_factor("28168370236334094367936640078057043313881469151722840306493"); #=> 30426633744568826749
say FLT_find_factor("97967651586822913179896725042136997967830602144506842054615710025444417607092711829309187"); #=> 86762184769343281845479348731
say FLT_find_factor("1129151505892449502375764445221583755878554451745780900429977", 3); #=> 867621847693432818454793487397