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congruence_of_squares_triangle.pl
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congruence_of_squares_triangle.pl
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#!/usr/bin/perl
# Highlight integers `k` in a triangle such that `k^2 (mod N)`
# is a square and leads to a non-trivial factorization of `N`.
use 5.010;
use strict;
use warnings;
use GD::Simple;
use ntheory qw(:all);
# Composite integer N for which x^2 == y^2 (mod N)
# and { gcd(x-y, N), gcd(x+y, N) } are non trivial factors of N.
my $N = 43 * 79;
my $i = 1;
my $j = 1;
my $n = shift(@ARGV) // 1000000;
my $limit = int(sqrt($n)) - 1;
my $img = GD::Simple->new($limit * 2, $limit + 1);
$img->bgcolor('black');
$img->rectangle(0, 0, $limit * 2, $limit + 1);
my $white = 0;
for (my $m = $limit; $m > 0; --$m) {
$img->moveTo($m, $i - 1);
for my $n ($j .. $i**2) {
my $copy = $j;
## $j = ($copy*$copy + 3*$copy + 1);
my $x = mulmod($j, $j, $N);
my $root = sqrtint($x);
my $r = gcd($root - $j, $N);
my $s = gcd($root + $j, $N);
if (is_square($x) and ($j % $N) != $root and (($r > 1 and $r < $N) and ($s > 1 and $s < $N))) {
$white = 0;
$img->fgcolor('white');
}
elsif (not $white) {
$white = 1;
$img->fgcolor('black');
}
$img->line(1);
$j = $copy;
++$j;
}
++$i;
}
open my $fh, '>:raw', 'congruence_of_squares.png';
print $fh $img->png;
close $fh;