684 lines
16 KiB
JavaScript
684 lines
16 KiB
JavaScript
/**
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* Absolute value. abs(a)==a if a>=0. abs(a)==-a if a<0
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*
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* @param {number|bigint} a
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*
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* @returns {bigint} the absolute value of a
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*/
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function abs(a) {
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a = BigInt(a);
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return (a >= _ZERO) ? a : -a;
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}
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/**
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* @typedef {Object} egcdReturn A triple (g, x, y), such that ax + by = g = gcd(a, b).
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* @property {bigint} g
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* @property {bigint} x
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* @property {bigint} y
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*/
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/**
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* An iterative implementation of the extended euclidean algorithm or extended greatest common divisor algorithm.
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* Take positive integers a, b as input, and return a triple (g, x, y), such that ax + by = g = gcd(a, b).
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*
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* @param {number|bigint} a
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* @param {number|bigint} b
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*
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* @returns {egcdReturn}
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*/
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function eGcd(a, b) {
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a = BigInt(a);
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b = BigInt(b);
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let x = _ZERO;
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let y = _ONE;
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let u = _ONE;
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let v = _ZERO;
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while (a !== _ZERO) {
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let q = b / a;
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let r = b % a;
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let m = x - (u * q);
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let n = y - (v * q);
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b = a;
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a = r;
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x = u;
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y = v;
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u = m;
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v = n;
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}
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return {
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b: b,
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x: x,
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y: y
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};
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}
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/**
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* Greatest-common divisor of two integers based on the iterative binary algorithm.
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*
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* @param {number|bigint} a
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* @param {number|bigint} b
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*
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* @returns {bigint} The greatest common divisor of a and b
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*/
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function gcd(a, b) {
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a = abs(a);
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b = abs(b);
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let shift = _ZERO;
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while (!((a | b) & _ONE)) {
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a >>= _ONE;
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b >>= _ONE;
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shift++;
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}
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while (!(a & _ONE)) a >>= _ONE;
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do {
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while (!(b & _ONE)) b >>= _ONE;
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if (a > b) {
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let x = a;
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a = b;
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b = x;
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}
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b -= a;
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} while (b);
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// rescale
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return a << shift;
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}
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/**
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* The test first tries if any of the first 250 small primes are a factor of the input number and then passes several
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* iterations of Miller-Rabin Probabilistic Primality Test (FIPS 186-4 C.3.1)
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*
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* @param {bigint} w An integer to be tested for primality
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* @param {number} iterations The number of iterations for the primality test. The value shall be consistent with Table C.1, C.2 or C.3
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*
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* @return {Promise} A promise that resolves to a boolean that is either true (a probably prime number) or false (definitely composite)
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*/
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async function isProbablyPrime(w, iterations = 16) {
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{ // browser
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return new Promise((resolve, reject) => {
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let worker = new Worker(_isProbablyPrimeWorkerURL());
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worker.onmessage = (event) => {
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worker.terminate();
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resolve(event.data.isPrime);
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};
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worker.onmessageerror = (event) => {
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reject(event);
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};
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worker.postMessage({
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'rnd': w,
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'iterations': iterations,
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'id': 0
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});
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});
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}
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}
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/**
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* The least common multiple computed as abs(a*b)/gcd(a,b)
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* @param {number|bigint} a
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* @param {number|bigint} b
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*
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* @returns {bigint} The least common multiple of a and b
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*/
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function lcm(a, b) {
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a = BigInt(a);
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b = BigInt(b);
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return abs(a * b) / gcd(a, b);
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}
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/**
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* Modular inverse.
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*
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* @param {number|bigint} a The number to find an inverse for
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* @param {number|bigint} n The modulo
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*
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* @returns {bigint} the inverse modulo n
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*/
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function modInv(a, n) {
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let egcd = eGcd(a, n);
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if (egcd.b !== _ONE) {
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return null; // modular inverse does not exist
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} else {
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return toZn(egcd.x, n);
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}
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}
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/**
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* Modular exponentiation a**b mod n
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* @param {number|bigint} a base
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* @param {number|bigint} b exponent
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* @param {number|bigint} n modulo
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*
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* @returns {bigint} a**b mod n
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*/
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function modPow(a, b, n) {
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// See Knuth, volume 2, section 4.6.3.
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n = BigInt(n);
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a = toZn(a, n);
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b = BigInt(b);
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if (b < _ZERO) {
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return modInv(modPow(a, abs(b), n), n);
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}
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let result = _ONE;
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let x = a;
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while (b > 0) {
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var leastSignificantBit = b % _TWO;
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b = b / _TWO;
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if (leastSignificantBit == _ONE) {
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result = result * x;
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result = result % n;
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}
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x = x * x;
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x = x % n;
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}
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return result;
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}
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/**
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* A probably-prime (Miller-Rabin), cryptographically-secure, random-number generator.
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* The browser version uses web workers to parallelise prime look up. Therefore, it does not lock the UI
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* main process, and it can be much faster (if several cores or cpu are available).
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* The node version can also use worker_threads if they are available (enabled by default with Node 11 and
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* and can be enabled at runtime executing node --experimental-worker with node >=10.5.0).
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*
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* @param {number} bitLength The required bit length for the generated prime
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* @param {number} iterations The number of iterations for the Miller-Rabin Probabilistic Primality Test
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*
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* @returns {Promise} A promise that resolves to a bigint probable prime of bitLength bits
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*/
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async function prime(bitLength, iterations = 16) {
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return new Promise((resolve) => {
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let workerList = [];
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const _onmessage = (msg, newWorker) => {
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if (msg.isPrime) {
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// if a prime number has been found, stop all the workers, and return it
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for (let j = 0; j < workerList.length; j++) {
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workerList[j].terminate();
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}
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while (workerList.length) {
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workerList.pop();
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}
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resolve(msg.value);
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} else { // if a composite is found, make the worker test another random number
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randBits(bitLength, true).then((buf) => {
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let rnd = fromBuffer(buf);
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try {
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newWorker.postMessage({
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'rnd': rnd,
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'iterations': iterations,
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'id': msg.id
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});
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} catch (error) {
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// The worker has already terminated. There is nothing to handle here
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}
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});
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}
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};
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{ //browser
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let workerURL = _isProbablyPrimeWorkerURL();
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for (let i = 0; i < self.navigator.hardwareConcurrency; i++) {
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let newWorker = new Worker(workerURL);
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newWorker.onmessage = (event) => _onmessage(event.data, newWorker);
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workerList.push(newWorker);
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}
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}
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for (let i = 0; i < workerList.length; i++) {
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randBits(bitLength, true).then((buf) => {
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let rnd = fromBuffer(buf);
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workerList[i].postMessage({
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'rnd': rnd,
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'iterations': iterations,
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'id': i
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});
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});
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}
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});
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}
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/**
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* Returns a cryptographically secure random integer between [min,max]
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* @param {bigint} max Returned value will be <= max
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* @param {bigint} min Returned value will be >= min
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*
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* @returns {Promise} A promise that resolves to a cryptographically secure random bigint between [min,max]
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*/
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async function randBetween(max, min = _ONE) {
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if (max <= min) throw new Error('max must be > min');
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const interval = max - min;
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let bitLen = bitLength(interval);
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let rnd;
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do {
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let buf = await randBits(bitLen);
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rnd = fromBuffer(buf);
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} while (rnd > interval);
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return rnd + min;
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}
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/**
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* Secure random bits for both node and browsers. Node version uses crypto.randomFill() and browser one self.crypto.getRandomValues()
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*
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* @param {number} bitLength The desired number of random bits
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* @param {boolean} forceLength If we want to force the output to have a specific bit length. It basically forces the msb to be 1
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*
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* @returns {Promise} A promise that resolves to a Buffer/UInt8Array filled with cryptographically secure random bits
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*/
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async function randBits(bitLength, forceLength = false) {
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const byteLength = Math.ceil(bitLength / 8);
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let rndBytes = await randBytes(byteLength, false);
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// Fill with 0's the extra birs
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rndBytes[0] = rndBytes[0] & (2 ** (bitLength % 8) - 1);
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if (forceLength) {
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let mask = (bitLength % 8) ? 2 ** ((bitLength % 8) - 1) : 128;
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rndBytes[0] = rndBytes[0] | mask;
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}
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return rndBytes;
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}
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/**
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* Secure random bytes for both node and browsers. Node version uses crypto.randomFill() and browser one self.crypto.getRandomValues()
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*
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* @param {number} byteLength The desired number of random bytes
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* @param {boolean} forceLength If we want to force the output to have a bit length of 8*byteLength. It basically forces the msb to be 1
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*
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* @returns {Promise} A promise that resolves to a Buffer/UInt8Array filled with cryptographically secure random bytes
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*/
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async function randBytes(byteLength, forceLength = false) {
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return new Promise((resolve) => {
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let buf;
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{ // browser
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buf = new Uint8Array(byteLength);
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self.crypto.getRandomValues(buf);
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// If fixed length is required we put the first bit to 1 -> to get the necessary bitLength
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if (forceLength)
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buf[0] = buf[0] | 128;
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resolve(buf);
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}
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});
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}
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/**
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* Finds the smallest positive element that is congruent to a in modulo n
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* @param {number|bigint} a An integer
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* @param {number|bigint} n The modulo
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*
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* @returns {bigint} The smallest positive representation of a in modulo n
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*/
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function toZn(a, n) {
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n = BigInt(n);
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a = BigInt(a) % n;
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return (a < 0) ? a + n : a;
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}
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/* HELPER FUNCTIONS */
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function fromBuffer(buf) {
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let ret = _ZERO;
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for (let i of buf.values()) {
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let bi = BigInt(i);
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ret = (ret << BigInt(8)) + bi;
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}
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return ret;
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}
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function bitLength(a) {
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let bits = 1;
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do {
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bits++;
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} while ((a >>= _ONE) > _ONE);
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return bits;
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}
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function _isProbablyPrimeWorkerURL() {
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// Let's us first add all the required functions
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let workerCode = `'use strict';const _ZERO = BigInt(0);const _ONE = BigInt(1);const _TWO = BigInt(2);const eGcd = ${eGcd.toString()};const modInv = ${modInv.toString()};const modPow = ${modPow.toString()};const toZn = ${toZn.toString()};const randBits = ${randBits.toString()};const randBytes = ${randBytes.toString()};const randBetween = ${randBetween.toString()};const isProbablyPrime = ${_isProbablyPrime.toString()};${bitLength.toString()}${fromBuffer.toString()}`;
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const _onmessage = async function (event) { // Let's start once we are called
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// event.data = {rnd: <bigint>, iterations: <number>}
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const isPrime = await isProbablyPrime(event.data.rnd, event.data.iterations);
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postMessage({
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'isPrime': isPrime,
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'value': event.data.rnd,
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'id': event.data.id
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});
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};
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workerCode += `onmessage = ${_onmessage.toString()};`;
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workerCode = `(() => {${workerCode}})()`; // encapsulate IIFE
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var _blob = new Blob([workerCode], { type: 'text/javascript' });
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return window.URL.createObjectURL(_blob);
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}
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async function _isProbablyPrime(w, iterations = 16) {
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/*
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PREFILTERING. Even values but 2 are not primes, so don't test.
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1 is not a prime and the M-R algorithm needs w>1.
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*/
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if (w === _TWO)
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return true;
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else if ((w & _ONE) === _ZERO || w === _ONE)
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return false;
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/*
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Test if any of the first 250 small primes are a factor of w. 2 is not tested because it was already tested above.
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*/
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const firstPrimes = [
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3,
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5,
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7,
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11,
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13,
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17,
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19,
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23,
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29,
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31,
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37,
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41,
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43,
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47,
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53,
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59,
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61,
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67,
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71,
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73,
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79,
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83,
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89,
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97,
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101,
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103,
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107,
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109,
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113,
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127,
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131,
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137,
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139,
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149,
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151,
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157,
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163,
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167,
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173,
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179,
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181,
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191,
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193,
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197,
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199,
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211,
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223,
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227,
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229,
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233,
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239,
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241,
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251,
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257,
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263,
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269,
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271,
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277,
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281,
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283,
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293,
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307,
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311,
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313,
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317,
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331,
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337,
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347,
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349,
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353,
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359,
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367,
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373,
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379,
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383,
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389,
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397,
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401,
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||
409,
|
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419,
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421,
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431,
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433,
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||
439,
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||
443,
|
||
449,
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||
457,
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||
461,
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||
463,
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||
467,
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||
479,
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||
487,
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||
491,
|
||
499,
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||
503,
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||
509,
|
||
521,
|
||
523,
|
||
541,
|
||
547,
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||
557,
|
||
563,
|
||
569,
|
||
571,
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||
577,
|
||
587,
|
||
593,
|
||
599,
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||
601,
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||
607,
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||
613,
|
||
617,
|
||
619,
|
||
631,
|
||
641,
|
||
643,
|
||
647,
|
||
653,
|
||
659,
|
||
661,
|
||
673,
|
||
677,
|
||
683,
|
||
691,
|
||
701,
|
||
709,
|
||
719,
|
||
727,
|
||
733,
|
||
739,
|
||
743,
|
||
751,
|
||
757,
|
||
761,
|
||
769,
|
||
773,
|
||
787,
|
||
797,
|
||
809,
|
||
811,
|
||
821,
|
||
823,
|
||
827,
|
||
829,
|
||
839,
|
||
853,
|
||
857,
|
||
859,
|
||
863,
|
||
877,
|
||
881,
|
||
883,
|
||
887,
|
||
907,
|
||
911,
|
||
919,
|
||
929,
|
||
937,
|
||
941,
|
||
947,
|
||
953,
|
||
967,
|
||
971,
|
||
977,
|
||
983,
|
||
991,
|
||
997,
|
||
1009,
|
||
1013,
|
||
1019,
|
||
1021,
|
||
1031,
|
||
1033,
|
||
1039,
|
||
1049,
|
||
1051,
|
||
1061,
|
||
1063,
|
||
1069,
|
||
1087,
|
||
1091,
|
||
1093,
|
||
1097,
|
||
1103,
|
||
1109,
|
||
1117,
|
||
1123,
|
||
1129,
|
||
1151,
|
||
1153,
|
||
1163,
|
||
1171,
|
||
1181,
|
||
1187,
|
||
1193,
|
||
1201,
|
||
1213,
|
||
1217,
|
||
1223,
|
||
1229,
|
||
1231,
|
||
1237,
|
||
1249,
|
||
1259,
|
||
1277,
|
||
1279,
|
||
1283,
|
||
1289,
|
||
1291,
|
||
1297,
|
||
1301,
|
||
1303,
|
||
1307,
|
||
1319,
|
||
1321,
|
||
1327,
|
||
1361,
|
||
1367,
|
||
1373,
|
||
1381,
|
||
1399,
|
||
1409,
|
||
1423,
|
||
1427,
|
||
1429,
|
||
1433,
|
||
1439,
|
||
1447,
|
||
1451,
|
||
1453,
|
||
1459,
|
||
1471,
|
||
1481,
|
||
1483,
|
||
1487,
|
||
1489,
|
||
1493,
|
||
1499,
|
||
1511,
|
||
1523,
|
||
1531,
|
||
1543,
|
||
1549,
|
||
1553,
|
||
1559,
|
||
1567,
|
||
1571,
|
||
1579,
|
||
1583,
|
||
1597,
|
||
];
|
||
for (let i = 0; i < firstPrimes.length && (BigInt(firstPrimes[i]) <= w); i++) {
|
||
const p = BigInt(firstPrimes[i]);
|
||
if (w === p)
|
||
return true;
|
||
else if (w % p === _ZERO)
|
||
return false;
|
||
}
|
||
|
||
/*
|
||
1. Let a be the largest integer such that 2**a divides w−1.
|
||
2. m = (w−1) / 2**a.
|
||
3. wlen = len (w).
|
||
4. For i = 1 to iterations do
|
||
4.1 Obtain a string b of wlen bits from an RBG.
|
||
Comment: Ensure that 1 < b < w−1.
|
||
4.2 If ((b ≤ 1) or (b ≥ w−1)), then go to step 4.1.
|
||
4.3 z = b**m mod w.
|
||
4.4 If ((z = 1) or (z = w − 1)), then go to step 4.7.
|
||
4.5 For j = 1 to a − 1 do.
|
||
4.5.1 z = z**2 mod w.
|
||
4.5.2 If (z = w−1), then go to step 4.7.
|
||
4.5.3 If (z = 1), then go to step 4.6.
|
||
4.6 Return COMPOSITE.
|
||
4.7 Continue.
|
||
Comment: Increment i for the do-loop in step 4.
|
||
5. Return PROBABLY PRIME.
|
||
*/
|
||
let a = _ZERO, d = w - _ONE;
|
||
while (d % _TWO === _ZERO) {
|
||
d /= _TWO;
|
||
++a;
|
||
}
|
||
|
||
let m = (w - _ONE) / (_TWO ** a);
|
||
|
||
loop: do {
|
||
let b = await randBetween(w - _ONE, _TWO);
|
||
let z = modPow(b, m, w);
|
||
if (z === _ONE || z === w - _ONE)
|
||
continue;
|
||
|
||
for (let j = 1; j < a; j++) {
|
||
z = modPow(z, _TWO, w);
|
||
if (z === w - _ONE)
|
||
continue loop;
|
||
if (z === _ONE)
|
||
break;
|
||
}
|
||
return false;
|
||
} while (--iterations);
|
||
|
||
return true;
|
||
}
|
||
|
||
/* HELPLER CONSTANTS/VARIABLES*/
|
||
const _ZERO = BigInt(0);
|
||
const _ONE = BigInt(1);
|
||
const _TWO = BigInt(2);
|
||
|
||
export { abs, eGcd, gcd, isProbablyPrime, lcm, modInv, modPow, prime, randBetween, randBits, randBytes, toZn };
|