A simple implementation of Shamir's Secret Sharing configured to use a finite field in GF(2^8) with 128 bit padding.
TypeScript variant of https://github.com/jwerle/shamirs-secret-sharing based on version 1.0.1
Much of what you see in this module has been ported from or directly influenced by secrets.js, c-sss, and libgfshare
$ npm install shamirs-secret-sharing-ts
import { split, combine } from 'shamirs-secret-sharing-ts'
const secret = Buffer.from('secret key')
const shares = split(secret, { shares: 10, threshold: 4 })
const recovered = combine(shares.slice(3, 7))
console.log(recovered.toString()) // 'secret key'
In Angular 2 or higher add following to polyfills.ts
(window as any).global = window;
// @ts-ignore
window.Buffer = window.Buffer || require('buffer').Buffer;
Generate a set of unique and distinct shares for a secret with a configured threshold.
secret
(required) - ABuffer
instance orstring
that represents a secret for which shares are created foropts
(required) - An object of options for configuring how shares are created for a secretopts.shares
(required) - The number ofn
shares that should be created for this secretopts.threshold
(required) - The number oft
ofn
distinct share that are required to reconstruct this secretopts.random
(optional) - An optional Pseudorandom number generator (PRNG) function that should generate a random value buffer based on some input. e.gopts.random = (size) => randomBytes(size)
Reconstruct a secret from a distinct set of shares. This function will
not throw an error for incorrect shares or if p(0)
is not the correct
secret for the given shares.
shares
(required) - An array of shares, that is an array of equally sized and distinctBuffer
instances, or strings
- https://en.wikipedia.org/wiki/Shamir%27s_Secret_Sharing
- https://en.wikipedia.org/wiki/Secret_sharing
- https://en.wikipedia.org/wiki/Lagrange_polynomial
- https://en.wikipedia.org/wiki/Horner%27s_method
- https://en.wikipedia.org/wiki/Pseudorandom_number_generator
- https://codesandbox.io/s/shamirs-secret-sharing-pcsbk
MIT