312 lines
13 KiB
Markdown
312 lines
13 KiB
Markdown
# bigint-crypto-utils
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Utils for working with cryptography using native JS (stage 3) implementation of BigInt. It includes some extra functions to work with modular arithmetics along with secure random numbers and a fast strong probable prime generation/testing (parallelised multi-threaded Miller-Rabin primality test). It can be used by any [Web Browsers or webviews supporting BigInt](https://developer.mozilla.org/en-US/docs/Web/JavaScript/Reference/Global_Objects/BigInt#Browser_compatibility) and with Node.js (>=10.4.0). In the former case, for multi-threaded primality tests, you should use Node.js 11 or enable at runtime with `node --experimental-worker` with Node.js >=10.5.0.
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_The operations supported on BigInts are not constant time. BigInt can be therefore **[unsuitable for use in cryptography](https://www.chosenplaintext.ca/articles/beginners-guide-constant-time-cryptography.html).** Many platforms provide native support for cryptography, such as [Web Cryptography API](https://w3c.github.io/webcrypto/) or [Node.js Crypto](https://nodejs.org/dist/latest/docs/api/crypto.html)._
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## Installation
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bigint-crypto-utils is distributed for [web browsers supporting BigInt](https://developer.mozilla.org/en-US/docs/Web/JavaScript/Reference/Global_Objects/BigInt#Browser_compatibility) as an ES6 module or a IIFE file, and for Node.js (>=10.4.0) as a CJS module.
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bigint-crypto-utils can be imported to your project with `npm`:
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```bash
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npm install bigint-crypto-utils
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```
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NPM installation defaults to the ES6 module for browsers and the CJS one for Node.js.
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For web browsers, you can also directly download the minimised version of the [IIFE file](https://raw.githubusercontent.com/juanelas/bigint-crypto-utils/master/dist/bigint-crypto-utils-latest.browser.min.js) or the [ES6 module](https://raw.githubusercontent.com/juanelas/bigint-crypto-utils/master/dist/bigint-crypto-utils-latest.browser.mod.min.js) from GitHub.
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## Usage example
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With node js:
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```javascript
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const bigintCryptoUtils = require('bigint-crypto-utils');
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// Stage 3 BigInts with value 666 can be declared as BigInt('666')
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// or the shorter new no-so-linter-friendly syntax 666n
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let a = BigInt('5');
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let b = BigInt('2');
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let n = BigInt('19');
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console.log(bigintCryptoUtils.modPow(a, b, n)); // prints 6
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console.log(bigintCryptoUtils.modInv(BigInt('2'), BigInt('5'))); // prints 3
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console.log(bigintCryptoUtils.modInv(BigInt('3'), BigInt('5'))); // prints 2
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// Generation of a probable prime of 2048 bits
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const prime = await bigintCryptoUtils.prime(2048);
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// Testing if a prime is a probable prime (Miller-Rabin)
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if ( await bigintCryptoUtils.isProbablyPrime(prime) )
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// code if is prime
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// Get a cryptographically secure random number between 1 and 2**256 bits.
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const rnd = bigintCryptoUtils.randBetween(BigInt(2)**256);
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```
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From a browser, you can just load the module in a html page as:
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```html
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<script type="module">
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import * as bigintCryptoUtils from 'bigint-utils-latest.browser.mod.min.js';
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let a = BigInt('5');
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let b = BigInt('2');
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let n = BigInt('19');
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console.log(bigintCryptoUtils.modPow(a, b, n)); // prints 6
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console.log(bigintCryptoUtils.modInv(BigInt('2'), BigInt('5'))); // prints 3
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console.log(bigintCryptoUtils.modInv(BigInt('3'), BigInt('5'))); // prints 2
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(async function () {
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// Generation of a probable prime of 2018 bits
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const p = await bigintCryptoUtils.prime(2048);
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// Testing if a prime is a probable prime (Miller-Rabin)
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const isPrime = await bigintCryptoUtils.isProbablyPrime(p);
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alert(p.toString() + '\nIs prime?\n' + isPrime);
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// Get a cryptographically secure random number between 1 and 2**256 bits.
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const rnd = await bigintCryptoUtils.randBetween(BigInt(2)**256);
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alert(rnd);
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})();
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</script>
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```
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# bigint-crypto-utils JS Doc
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## Functions
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<dl>
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<dt><a href="#abs">abs(a)</a> ⇒ <code>bigint</code></dt>
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<dd><p>Absolute value. abs(a)==a if a>=0. abs(a)==-a if a<0</p>
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</dd>
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<dt><a href="#eGcd">eGcd(a, b)</a> ⇒ <code><a href="#egcdReturn">egcdReturn</a></code></dt>
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<dd><p>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).</p>
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</dd>
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<dt><a href="#gcd">gcd(a, b)</a> ⇒ <code>bigint</code></dt>
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<dd><p>Greatest-common divisor of two integers based on the iterative binary algorithm.</p>
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</dd>
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<dt><a href="#isProbablyPrime">isProbablyPrime(w, iterations)</a> ⇒ <code>Promise</code></dt>
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<dd><p>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)</p>
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</dd>
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<dt><a href="#lcm">lcm(a, b)</a> ⇒ <code>bigint</code></dt>
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<dd><p>The least common multiple computed as abs(a*b)/gcd(a,b)</p>
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</dd>
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<dt><a href="#modInv">modInv(a, n)</a> ⇒ <code>bigint</code></dt>
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<dd><p>Modular inverse.</p>
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</dd>
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<dt><a href="#modPow">modPow(a, b, n)</a> ⇒ <code>bigint</code></dt>
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<dd><p>Modular exponentiation a**b mod n</p>
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</dd>
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<dt><a href="#prime">prime(bitLength, iterations)</a> ⇒ <code>Promise</code></dt>
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<dd><p>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)</p>
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</dd>
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<dt><a href="#randBetween">randBetween(max, min)</a> ⇒ <code>Promise</code></dt>
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<dd><p>Returns a cryptographically secure random integer between [min,max]</p>
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</dd>
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<dt><a href="#randBits">randBits(bitLength, forceLength)</a> ⇒ <code>Promise</code></dt>
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<dd><p>Secure random bits for both node and browsers. Node version uses crypto.randomFill() and browser one self.crypto.getRandomValues()</p>
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</dd>
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<dt><a href="#randBytes">randBytes(byteLength, forceLength)</a> ⇒ <code>Promise</code></dt>
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<dd><p>Secure random bytes for both node and browsers. Node version uses crypto.randomFill() and browser one self.crypto.getRandomValues()</p>
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</dd>
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<dt><a href="#toZn">toZn(a, n)</a> ⇒ <code>bigint</code></dt>
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<dd><p>Finds the smallest positive element that is congruent to a in modulo n</p>
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</dd>
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</dl>
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## Typedefs
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<dl>
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<dt><a href="#egcdReturn">egcdReturn</a> : <code>Object</code></dt>
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<dd><p>A triple (g, x, y), such that ax + by = g = gcd(a, b).</p>
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</dd>
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</dl>
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<a name="abs"></a>
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## abs(a) ⇒ <code>bigint</code>
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Absolute value. abs(a)==a if a>=0. abs(a)==-a if a<0
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**Kind**: global function
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**Returns**: <code>bigint</code> - the absolute value of a
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| Param | Type |
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| --- | --- |
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| a | <code>number</code> \| <code>bigint</code> |
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<a name="eGcd"></a>
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## eGcd(a, b) ⇒ [<code>egcdReturn</code>](#egcdReturn)
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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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**Kind**: global function
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| Param | Type |
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| --- | --- |
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| a | <code>number</code> \| <code>bigint</code> |
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| b | <code>number</code> \| <code>bigint</code> |
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<a name="gcd"></a>
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## gcd(a, b) ⇒ <code>bigint</code>
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Greatest-common divisor of two integers based on the iterative binary algorithm.
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**Kind**: global function
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**Returns**: <code>bigint</code> - The greatest common divisor of a and b
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| Param | Type |
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| --- | --- |
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| a | <code>number</code> \| <code>bigint</code> |
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| b | <code>number</code> \| <code>bigint</code> |
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<a name="isProbablyPrime"></a>
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## isProbablyPrime(w, iterations) ⇒ <code>Promise</code>
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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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**Kind**: global function
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**Returns**: <code>Promise</code> - A promise that resolve to a boolean that is either true (a probably prime number) or false (definitely composite)
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| Param | Type | Description |
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| --- | --- | --- |
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| w | <code>bigint</code> | An integer to be tested for primality |
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| iterations | <code>number</code> | 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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<a name="lcm"></a>
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## lcm(a, b) ⇒ <code>bigint</code>
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The least common multiple computed as abs(a*b)/gcd(a,b)
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**Kind**: global function
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**Returns**: <code>bigint</code> - The least common multiple of a and b
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| Param | Type |
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| --- | --- |
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| a | <code>number</code> \| <code>bigint</code> |
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| b | <code>number</code> \| <code>bigint</code> |
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<a name="modInv"></a>
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## modInv(a, n) ⇒ <code>bigint</code>
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Modular inverse.
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**Kind**: global function
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**Returns**: <code>bigint</code> - the inverse modulo n
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| Param | Type | Description |
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| --- | --- | --- |
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| a | <code>number</code> \| <code>bigint</code> | The number to find an inverse for |
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| n | <code>number</code> \| <code>bigint</code> | The modulo |
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<a name="modPow"></a>
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## modPow(a, b, n) ⇒ <code>bigint</code>
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Modular exponentiation a**b mod n
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**Kind**: global function
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**Returns**: <code>bigint</code> - a**b mod n
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| Param | Type | Description |
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| --- | --- | --- |
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| a | <code>number</code> \| <code>bigint</code> | base |
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| b | <code>number</code> \| <code>bigint</code> | exponent |
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| n | <code>number</code> \| <code>bigint</code> | modulo |
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<a name="prime"></a>
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## prime(bitLength, iterations) ⇒ <code>Promise</code>
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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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**Kind**: global function
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**Returns**: <code>Promise</code> - A promise that resolves to a bigint probable prime of bitLength bits
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| Param | Type | Description |
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| --- | --- | --- |
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| bitLength | <code>number</code> | The required bit length for the generated prime |
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| iterations | <code>number</code> | The number of iterations for the Miller-Rabin Probabilistic Primality Test |
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<a name="randBetween"></a>
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## randBetween(max, min) ⇒ <code>Promise</code>
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Returns a cryptographically secure random integer between [min,max]
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**Kind**: global function
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**Returns**: <code>Promise</code> - A promise that resolves to a cryptographically secure random bigint between [min,max]
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| Param | Type | Description |
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| --- | --- | --- |
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| max | <code>bigint</code> | Returned value will be <= max |
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| min | <code>bigint</code> | Returned value will be >= min |
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<a name="randBits"></a>
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## randBits(bitLength, forceLength) ⇒ <code>Promise</code>
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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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**Kind**: global function
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**Returns**: <code>Promise</code> - A promise that resolves to a Buffer/UInt8Array filled with cryptographically secure random bits
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| Param | Type | Description |
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| --- | --- | --- |
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| bitLength | <code>number</code> | The desired number of random bits |
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| forceLength | <code>boolean</code> | 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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<a name="randBytes"></a>
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## randBytes(byteLength, forceLength) ⇒ <code>Promise</code>
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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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**Kind**: global function
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**Returns**: <code>Promise</code> - A promise that resolves to a Buffer/UInt8Array filled with cryptographically secure random bytes
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| Param | Type | Description |
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| --- | --- | --- |
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| byteLength | <code>number</code> | The desired number of random bytes |
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| forceLength | <code>boolean</code> | 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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<a name="toZn"></a>
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## toZn(a, n) ⇒ <code>bigint</code>
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Finds the smallest positive element that is congruent to a in modulo n
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**Kind**: global function
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**Returns**: <code>bigint</code> - The smallest positive representation of a in modulo n
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| Param | Type | Description |
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| --- | --- | --- |
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| a | <code>number</code> \| <code>bigint</code> | An integer |
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| n | <code>number</code> \| <code>bigint</code> | The modulo |
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<a name="egcdReturn"></a>
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## egcdReturn : <code>Object</code>
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A triple (g, x, y), such that ax + by = g = gcd(a, b).
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**Kind**: global typedef
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**Properties**
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| Name | Type |
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| --- | --- |
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| g | <code>bigint</code> |
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| x | <code>bigint</code> |
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| y | <code>bigint</code> |
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* * *
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