secret-sharing: Information-theoretic secure secret sharing

[ cryptography, data, lgpl, library ] [ Propose Tags ]

Please see the README on GitHub at https://github.com/pwrobinson/secret-sharing#readme

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Crypto
- Crypto.SecretSharing
  - Crypto.SecretSharing.Internal

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secret-sharing-1.0.1.1.tar.gz [browse] (Cabal source package)
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1.0.0.0, 1.0.0.3

Versions [RSS]	1.0.0.0, 1.0.0.1, 1.0.0.2, 1.0.0.3, 1.0.1.0, 1.0.1.1, 1.0.1.2
Change log	ChangeLog.md
Dependencies	base (>=4.6 && <5), binary (>=0.5.1.1), bytestring (>=0.10.0.2), dice-entropy-conduit (>=1.0.0.0), finite-field (>=0.8.0), vector (>=0.10.11.0) [details]
License	LGPL-2.1-only
Copyright	2014-2020 Peter Robinson
Author	Peter Robinson
Maintainer	pwr@lowerbound.io
Category	Data, Cryptography
Home page	https://github.com/pwrobinson/secret-sharing#readme
Bug tracker	https://github.com/pwrobinson/secret-sharing/issues
Source repo	head: git clone https://github.com/pwrobinson/secret-sharing
Uploaded	by PeterRobinson at 2020-05-09T15:23:18Z
Distributions	Debian:1.0.1.2, NixOS:1.0.1.2
Reverse Dependencies	2 direct, 0 indirect [details]
Downloads	4334 total (26 in the last 30 days)
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Status	Docs available [build log] Last success reported on 2020-05-09 [all 1 reports]

Readme for secret-sharing-1.0.1.1

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Implementation of an (m,n)-threshold secret sharing scheme. A given ByteString b (the secret) is split into n shares, and any m shares are sufficient to reconstruct b. The scheme preserves information-theoretic perfect secrecy in the sense that the knowledge of up to m-1 shares does not reveal any information about the secret b.

Example in GHCi: Suppose that you want to split the string "my secret data" into n=5 shares such that at least m=3 shares are necessary to reconstruct the secret.

❯ :m + Data.ByteString.Lazy.Char8 Crypto.SecretSharing
❯ let secret = pack "my secret message!"
❯ shares <- encode 3 5 secret
❯ mapM_ (Prelude.putStrLn . show) shares -- each share should be deposited at a different site.
(1,"\134\168\154\SUBV\248\CAN:\250y<\GS\EOT*\t\222_\140")
(2,"\225\206\241\136\SUBse\199r\169\162\131D4\179P\210x")
(3,"~\238%\192\174\206\\\f\214\173\162\148\&3\139_\183\193\235")
(4,"Z\b0\188\DC2\f\247\f,\136\&6S\209\&5\n\FS,\223")
(5,"x\EM\CAN\DELI*<\193q7d\192!/\183v\DC3T")
❯ let shares' = Prelude.drop 2 shares
❯ decode shares'
"my secret message!"

The mathematics behind the secret sharing scheme is described in: "/How to share a secret/." by Adi Shamir. In Communications of the ACM 22 (11): 612–613, 1979.