172 lines
4.5 KiB
PHP
172 lines
4.5 KiB
PHP
<?php
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set_include_path(get_include_path() . PATH_SEPARATOR . dirname(__FILE__) . DIRECTORY_SEPARATOR . 'libpy2php');
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require_once ('libpy2php.php');
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require_once ('random.php');
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function primesbelow($N) {
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$correction = (($N % 6) > 1);
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$N = [0 => $N, 1 => ($N - 1), 2 => ($N + 4), 3 => ($N + 3), 4 => ($N + 2), 5 => ($N + 1) ][($N % 6) ];
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$sieve = ([true] * ($N / 3));
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$sieve[0] = false;
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foreach (pyjslib_range(((pyjslib_int(pow($N, 0.5)) / 3) + 1)) as $i) {
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if ($sieve[$i]) {
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$k = ((3 * $i) + 1) | 1;
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$sieve[(($k * $k) / 3), null, (2 * $k) ] = // finish this
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([false] * ((((($N / 6) - (($k * $k) / 6)) - 1) / $k) + 1));
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$sieve[(((($k * $k) + (4 * $k)) - ((2 * $k) * ($i % 2))) / 3), null, (2 * $k) ] = ([false] * ((((($N / 6) - (((($k * $k) + (4 * $k)) - ((2 * $k) * ($i % 2))) / 6)) - 1) / $k) + 1));
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}
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}
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// finish this
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return ([2, 3] + [(3 * $i + 1) | 1 for $i in range(1, floor($N/3) - $correction) if $sieve[$i]]
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);
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}
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$smallprimeset = set(primesbelow(100000));
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$_smallprimeset = 100000;
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function isprime($n, $precision = 7) {
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if (($n == 1) || (($n % 2) == 0)) {
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return false;
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} else if (($n < 1)) {
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throw new $ValueError('Out of bounds, first argument must be > 0');
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} else if (($n < $_smallprimeset)) {
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return in_array($n, $smallprimeset);
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}
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$d = ($n - 1);
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$s = 0;
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while ((($d % 2) == 0)) {
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$d
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//= 2;
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$s+= 1;
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}
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foreach (pyjslib_range($precision) as $repeat) {
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$a = random::randrange(2, ($n - 2));
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$x = pow($a, $d, $n);
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if (($x == 1) || ($x == ($n - 1))) {
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continue;
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}
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foreach (pyjslib_range(($s - 1)) as $r) {
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$x = pow($x, 2, $n);
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if (($x == 1)) {
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return false;
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}
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if (($x == ($n - 1))) {
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break;
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}
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}
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}
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return true;
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}
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function pollard_brent($n) {
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if ((($n % 2) == 0)) {
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return 2;
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}
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if ((($n % 3) == 0)) {
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return 3;
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}
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list($y, $c, $m) = [random::randint(1, ($n - 1)), random::randint(1, ($n - 1)), random::randint(1, ($n - 1)) ];
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list($g, $r, $q) = [1, 1, 1];
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while (($g == 1)) {
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$x = $y;
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foreach (pyjslib_range($r) as $i) {
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$y = ((pow($y, 2, $n) + $c) % $n);
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}
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$k = 0;
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while (($k < $r) && ($g == 1)) {
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$ys = $y;
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foreach (pyjslib_range(min($m, ($r - $k))) as $i) {
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$y = ((pow($y, 2, $n) + $c) % $n);
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$q = (($q * abs(($x - $y))) % $n);
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}
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$g = gcd($q, $n);
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$k+= $m;
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}
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$r*= 2;
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}
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if (($g == $n)) {
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while (true) {
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$ys = ((pow($ys, 2, $n) + $c) % $n);
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$g = gcd(abs(($x - $ys)), $n);
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if (($g > 1)) {
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break;
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}
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}
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}
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return $g;
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}
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$smallprimes = primesbelow(10000);
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function primefactors($n, $sort = false) {
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$factors = [];
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$limit = (pyjslib_int(pow($n, 0.5)) + 1);
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foreach ($smallprimes as $checker) {
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if (($checker > $limit)) {
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break;
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}
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while ((($n % $checker) == 0)) {
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$factors[] = $checker;
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$n
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//= $checker;
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$limit = (pyjslib_int(pow($n, 0.5)) + 1);
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if (($checker > $limit)) {
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break;
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}
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}
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}
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if (($n < 2)) {
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return $factors;
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}
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while (($n > 1)) {
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if (isprime($n)) {
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$factors[] = $n;
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break;
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}
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$factor = pollard_brent($n);
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$factors->extend(primefactors($factor));
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$n
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//= $factor;
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}
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if ($sort) {
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$factors->sort();
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}
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return $factors;
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}
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function factorization($n) {
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$factors = [];
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foreach (primefactors($n) as $p1) {
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try {
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$factors[$p1]+= 1;
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}
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catch(KeyError $e) {
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$factors[$p1] = 1;
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}
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}
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return $factors;
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}
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$totients = [];
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function totient($n) {
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if (($n == 0)) {
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return 1;
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}
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try {
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return $totients[$n];
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}
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catch(KeyError $e) {
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}
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$tot = 1;
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foreach (factorization($n)->items() as list($p, $exp)) {
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$tot*= (($p - 1) * pow($p, ($exp - 1)));
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}
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$totients[$n] = $tot;
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return $tot;
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}
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function gcd($a, $b) {
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if (($a == $b)) {
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return $a;
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}
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while (($b > 0)) {
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list($a, $b) = [$b, ($a % $b) ];
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}
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return $a;
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}
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function lcm($a, $b) {
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return (abs(($a * $b)) / gcd($a, $b));
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}
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