bigint-mod-arith/README.md

# bigint-mod-arith 

Some extra functions to work with modular arithmetics using native JS (stage 3) implementation of BigInt. It can be used with Node.js (starting in version 10.4.0) and [Web Browsers supporting BigInt](https://developer.mozilla.org/en-US/docs/Web/JavaScript/Reference/Global_Objects/BigInt#Browser_compatibility).

If you are looking for a cryptographically secure random generator and for probale primes (generation and testing), you may be interested in [bigint-secrets](https://github.com/juanelas/bigint-secrets)

_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 [webcrypto](https://w3c.github.io/webcrypto/Overview.html) or [node crypto](https://nodejs.org/dist/latest/docs/api/crypto.html).

## Installation
bigint-mod-arith is distributed as both an ES6 and a CJS module.

The ES6 module is built for any [web browser supporting BigInt](https://developer.mozilla.org/en-US/docs/Web/JavaScript/Reference/Global_Objects/BigInt#Browser_compatibility). The module only uses native javascript implementations and no polyfills had been applied.

The CJS module is built as a standard node module.

bigint-mod-arith can be imported to your project with `npm`:
```bash
npm install bigint-mod-arith
```

For web brosers, you can also [download the bundle from GitHub](https://raw.githubusercontent.com/juanelas/bigint-mod-arith/master/dist/bigint-mod-arith-latest.browser.mod.min.js) or just hotlink to it:
```html
<script type="module" src="https://raw.githubusercontent.com/juanelas/bigint-mod-arith/master/dist/bigint-mod-arith-latest.browser.mod.min.js"></script>
```

## Usage examples

```javascript
const modArith = require('bigint-mod-arith');

let a = BigInt(5); // more linter friendly
let b = 2n; // stage 3 short syntax for BigInt
let n = 19n;

console.log(modArith.modPow(a, b, n)); // prints 13

console.log(modArith.modInv(2n, 5n)); // prints 3

console.log(modArith.modInv(3n, 5n)); // prints 2
```

# bigint-mod-arith JS Doc

## Functions

<dl>
<dt><a href="#abs">abs(a)</a> ⇒ <code>bigint</code></dt>
<dd><p>Absolute value. abs(a)==a if a&gt;=0. abs(a)==-a if a&lt;0</p>
</dd>
<dt><a href="#gcd">gcd(a, b)</a> ⇒ <code>bigint</code></dt>
<dd><p>Greatest-common divisor of two integers based on the iterative binary algorithm.</p>
</dd>
<dt><a href="#lcm">lcm(a, b)</a> ⇒ <code>bigint</code></dt>
<dd><p>The least common multiple computed as abs(a*b)/gcd(a,b)</p>
</dd>
<dt><a href="#toZn">toZn(a, n)</a> ⇒ <code>bigint</code></dt>
<dd><p>Finds the smallest positive element that is congruent to a in modulo n</p>
</dd>
<dt><a href="#eGcd">eGcd(a, b)</a> ⇒ <code><a href="#egcdReturn">egcdReturn</a></code></dt>
<dd><p>An iterative implementation of the extended euclidean algorithm or extended greatest common divisor algorithm. 
Take positive integers a, b as input, and return a triple (g, x, y), such that ax + by = g = gcd(a, b).</p>
</dd>
<dt><a href="#modInv">modInv(a, n)</a> ⇒ <code>bigint</code></dt>
<dd><p>Modular inverse.</p>
</dd>
<dt><a href="#modPow">modPow(a, b, n)</a> ⇒ <code>bigint</code></dt>
<dd><p>Modular exponentiation a**b mod n</p>
</dd>
</dl>

## Typedefs

<dl>
<dt><a href="#egcdReturn">egcdReturn</a> : <code>Object</code></dt>
<dd><p>A triple (g, x, y), such that ax + by = g = gcd(a, b).</p>
</dd>
</dl>

<a name="abs"></a>

## abs(a) ⇒ <code>bigint</code>
Absolute value. abs(a)==a if a>=0. abs(a)==-a if a<0

**Kind**: global function  
**Returns**: <code>bigint</code> - the absolute value of a  

| Param | Type |
| --- | --- |
| a | <code>number</code> \| <code>bigint</code> | 

<a name="gcd"></a>

## gcd(a, b) ⇒ <code>bigint</code>
Greatest-common divisor of two integers based on the iterative binary algorithm.

**Kind**: global function  
**Returns**: <code>bigint</code> - The greatest common divisor of a and b  

| Param | Type |
| --- | --- |
| a | <code>number</code> \| <code>bigint</code> | 
| b | <code>number</code> \| <code>bigint</code> | 

<a name="lcm"></a>

## lcm(a, b) ⇒ <code>bigint</code>
The least common multiple computed as abs(a*b)/gcd(a,b)

**Kind**: global function  
**Returns**: <code>bigint</code> - The least common multiple of a and b  

| Param | Type |
| --- | --- |
| a | <code>number</code> \| <code>bigint</code> | 
| b | <code>number</code> \| <code>bigint</code> | 

<a name="toZn"></a>

## toZn(a, n) ⇒ <code>bigint</code>
Finds the smallest positive element that is congruent to a in modulo n

**Kind**: global function  
**Returns**: <code>bigint</code> - The smallest positive representation of a in modulo n  

| Param | Type | Description |
| --- | --- | --- |
| a | <code>number</code> \| <code>bigint</code> | An integer |
| n | <code>number</code> \| <code>bigint</code> | The modulo |

<a name="eGcd"></a>

## eGcd(a, b) ⇒ [<code>egcdReturn</code>](#egcdReturn)
An iterative implementation of the extended euclidean algorithm or extended greatest common divisor algorithm. 
Take positive integers a, b as input, and return a triple (g, x, y), such that ax + by = g = gcd(a, b).

**Kind**: global function  

| Param | Type |
| --- | --- |
| a | <code>number</code> \| <code>bigint</code> | 
| b | <code>number</code> \| <code>bigint</code> | 

<a name="modInv"></a>

## modInv(a, n) ⇒ <code>bigint</code>
Modular inverse.

**Kind**: global function  
**Returns**: <code>bigint</code> - the inverse modulo n  

| Param | Type | Description |
| --- | --- | --- |
| a | <code>number</code> \| <code>bigint</code> | The number to find an inverse for |
| n | <code>number</code> \| <code>bigint</code> | The modulo |

<a name="modPow"></a>

## modPow(a, b, n) ⇒ <code>bigint</code>
Modular exponentiation a**b mod n

**Kind**: global function  
**Returns**: <code>bigint</code> - a**b mod n  

| Param | Type | Description |
| --- | --- | --- |
| a | <code>number</code> \| <code>bigint</code> | base |
| b | <code>number</code> \| <code>bigint</code> | exponent |
| n | <code>number</code> \| <code>bigint</code> | modulo |

<a name="egcdReturn"></a>

## egcdReturn : <code>Object</code>
A triple (g, x, y), such that ax + by = g = gcd(a, b).

**Kind**: global typedef  
**Properties**

| Name | Type |
| --- | --- |
| g | <code>bigint</code> | 
| x | <code>bigint</code> | 
| y | <code>bigint</code> | 


* * *
first commit 2019-03-17 08:40:35 +00:00			`# bigint-mod-arith`

More detailed README 2019-04-06 08:50:29 +00:00			`Some extra functions to work with modular arithmetics using native JS (stage 3) implementation of BigInt. It can be used with Node.js (starting in version 10.4.0) and [Web Browsers supporting BigInt](https://developer.mozilla.org/en-US/docs/Web/JavaScript/Reference/Global_Objects/BigInt#Browser_compatibility).`

			`If you are looking for a cryptographically secure random generator and for probale primes (generation and testing), you may be interested in [bigint-secrets](https://github.com/juanelas/bigint-secrets)`

			`_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 [webcrypto](https://w3c.github.io/webcrypto/Overview.html) or [node crypto](https://nodejs.org/dist/latest/docs/api/crypto.html).`

			`## Installation`
			`bigint-mod-arith is distributed as both an ES6 and a CJS module.`

			`The ES6 module is built for any [web browser supporting BigInt](https://developer.mozilla.org/en-US/docs/Web/JavaScript/Reference/Global_Objects/BigInt#Browser_compatibility). The module only uses native javascript implementations and no polyfills had been applied.`

			`The CJS module is built as a standard node module.`

			bigint-mod-arith can be imported to your project with `npm`:
			```bash
			`npm install bigint-mod-arith`
			```

			`For web brosers, you can also [download the bundle from GitHub](https://raw.githubusercontent.com/juanelas/bigint-mod-arith/master/dist/bigint-mod-arith-latest.browser.mod.min.js) or just hotlink to it:`
			```html
			`<script type="module" src="https://raw.githubusercontent.com/juanelas/bigint-mod-arith/master/dist/bigint-mod-arith-latest.browser.mod.min.js"></script>`
			```
first commit 2019-03-17 08:40:35 +00:00
			`## Usage examples`

			```javascript
			`const modArith = require('bigint-mod-arith');`

More detailed README 2019-04-06 08:50:29 +00:00			`let a = BigInt(5); // more linter friendly`
			`let b = 2n; // stage 3 short syntax for BigInt`
first commit 2019-03-17 08:40:35 +00:00			`let n = 19n;`

			`console.log(modArith.modPow(a, b, n)); // prints 13`

			`console.log(modArith.modInv(2n, 5n)); // prints 3`

			`console.log(modArith.modInv(3n, 5n)); // prints 2`
			```

More detailed README 2019-04-06 08:50:29 +00:00			`# bigint-mod-arith JS Doc`

first commit 2019-03-17 08:40:35 +00:00			`## Functions`

			`<dl>`
			`<dt><a href="#abs">abs(a)</a> ⇒ <code>bigint</code></dt>`
			`<dd><p>Absolute value. abs(a)==a if a>=0. abs(a)==-a if a<0</p>`
			`</dd>`
			`<dt><a href="#gcd">gcd(a, b)</a> ⇒ <code>bigint</code></dt>`
			`<dd><p>Greatest-common divisor of two integers based on the iterative binary algorithm.</p>`
			`</dd>`
			`<dt><a href="#lcm">lcm(a, b)</a> ⇒ <code>bigint</code></dt>`
			`<dd><p>The least common multiple computed as abs(a*b)/gcd(a,b)</p>`
			`</dd>`
			`<dt><a href="#toZn">toZn(a, n)</a> ⇒ <code>bigint</code></dt>`
			`<dd><p>Finds the smallest positive element that is congruent to a in modulo n</p>`
			`</dd>`
			`<dt><a href="#eGcd">eGcd(a, b)</a> ⇒ <code><a href="#egcdReturn">egcdReturn</a></code></dt>`
			`<dd><p>An iterative implementation of the extended euclidean algorithm or extended greatest common divisor algorithm.`
			`Take positive integers a, b as input, and return a triple (g, x, y), such that ax + by = g = gcd(a, b).</p>`
			`</dd>`
			`<dt><a href="#modInv">modInv(a, n)</a> ⇒ <code>bigint</code></dt>`
			`<dd><p>Modular inverse.</p>`
			`</dd>`
			`<dt><a href="#modPow">modPow(a, b, n)</a> ⇒ <code>bigint</code></dt>`
			`<dd><p>Modular exponentiation a**b mod n</p>`
			`</dd>`
			`</dl>`

			`## Typedefs`

			`<dl>`
			`<dt><a href="#egcdReturn">egcdReturn</a> : <code>Object</code></dt>`
			`<dd><p>A triple (g, x, y), such that ax + by = g = gcd(a, b).</p>`
			`</dd>`
			`</dl>`

			`<a name="abs"></a>`

			`## abs(a) ⇒ <code>bigint</code>`
			`Absolute value. abs(a)==a if a>=0. abs(a)==-a if a<0`

			`Kind: global function`
			`Returns: <code>bigint</code> - the absolute value of a`

			`\| Param \| Type \|`
			`\| --- \| --- \|`
			`\| a \| <code>number</code> \\| <code>bigint</code> \|`

			`<a name="gcd"></a>`

			`## gcd(a, b) ⇒ <code>bigint</code>`
			`Greatest-common divisor of two integers based on the iterative binary algorithm.`

			`Kind: global function`
			`Returns: <code>bigint</code> - The greatest common divisor of a and b`

			`\| Param \| Type \|`
			`\| --- \| --- \|`
			`\| a \| <code>number</code> \\| <code>bigint</code> \|`
			`\| b \| <code>number</code> \\| <code>bigint</code> \|`

			`<a name="lcm"></a>`

			`## lcm(a, b) ⇒ <code>bigint</code>`
			`The least common multiple computed as abs(a*b)/gcd(a,b)`

			`Kind: global function`
			`Returns: <code>bigint</code> - The least common multiple of a and b`

			`\| Param \| Type \|`
			`\| --- \| --- \|`
			`\| a \| <code>number</code> \\| <code>bigint</code> \|`
			`\| b \| <code>number</code> \\| <code>bigint</code> \|`

			`<a name="toZn"></a>`

			`## toZn(a, n) ⇒ <code>bigint</code>`
			`Finds the smallest positive element that is congruent to a in modulo n`

			`Kind: global function`
			`Returns: <code>bigint</code> - The smallest positive representation of a in modulo n`

			`\| Param \| Type \| Description \|`
			`\| --- \| --- \| --- \|`
			`\| a \| <code>number</code> \\| <code>bigint</code> \| An integer \|`
			`\| n \| <code>number</code> \\| <code>bigint</code> \| The modulo \|`

			`<a name="eGcd"></a>`

			`## eGcd(a, b) ⇒ [<code>egcdReturn</code>](#egcdReturn)`
			`An iterative implementation of the extended euclidean algorithm or extended greatest common divisor algorithm.`
			`Take positive integers a, b as input, and return a triple (g, x, y), such that ax + by = g = gcd(a, b).`

			`Kind: global function`

			`\| Param \| Type \|`
			`\| --- \| --- \|`
			`\| a \| <code>number</code> \\| <code>bigint</code> \|`
			`\| b \| <code>number</code> \\| <code>bigint</code> \|`

			`<a name="modInv"></a>`

			`## modInv(a, n) ⇒ <code>bigint</code>`
			`Modular inverse.`

			`Kind: global function`
			`Returns: <code>bigint</code> - the inverse modulo n`

			`\| Param \| Type \| Description \|`
			`\| --- \| --- \| --- \|`
			`\| a \| <code>number</code> \\| <code>bigint</code> \| The number to find an inverse for \|`
			`\| n \| <code>number</code> \\| <code>bigint</code> \| The modulo \|`

			`<a name="modPow"></a>`

			`## modPow(a, b, n) ⇒ <code>bigint</code>`
			`Modular exponentiation a**b mod n`

			`Kind: global function`
			`Returns: <code>bigint</code> - a**b mod n`

			`\| Param \| Type \| Description \|`
			`\| --- \| --- \| --- \|`
			`\| a \| <code>number</code> \\| <code>bigint</code> \| base \|`
			`\| b \| <code>number</code> \\| <code>bigint</code> \| exponent \|`
			`\| n \| <code>number</code> \\| <code>bigint</code> \| modulo \|`

			`<a name="egcdReturn"></a>`

			`## egcdReturn : <code>Object</code>`
			`A triple (g, x, y), such that ax + by = g = gcd(a, b).`

			`Kind: global typedef`
			`Properties`

			`\| Name \| Type \|`
			`\| --- \| --- \|`
			`\| g \| <code>bigint</code> \|`
			`\| x \| <code>bigint</code> \|`
			`\| y \| <code>bigint</code> \|`


			`* * *`