@exodus/elliptic
v6.6.1-precomputed
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EC cryptography
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Elliptic
Fast elliptic-curve cryptography in a plain javascript implementation.
NOTE: Please take a look at http://safecurves.cr.yp.to/ before choosing a curve for your cryptography operations.
Incentive
ECC is much slower than regular RSA cryptography, the JS implementations are even more slower.
Benchmarks
$ node benchmarks/index.js
Benchmarking: sign
elliptic#sign x 262 ops/sec ±0.51% (177 runs sampled)
eccjs#sign x 55.91 ops/sec ±0.90% (144 runs sampled)
------------------------
Fastest is elliptic#sign
========================
Benchmarking: verify
elliptic#verify x 113 ops/sec ±0.50% (166 runs sampled)
eccjs#verify x 48.56 ops/sec ±0.36% (125 runs sampled)
------------------------
Fastest is elliptic#verify
========================
Benchmarking: gen
elliptic#gen x 294 ops/sec ±0.43% (176 runs sampled)
eccjs#gen x 62.25 ops/sec ±0.63% (129 runs sampled)
------------------------
Fastest is elliptic#gen
========================
Benchmarking: ecdh
elliptic#ecdh x 136 ops/sec ±0.85% (156 runs sampled)
------------------------
Fastest is elliptic#ecdh
========================
API
ECDSA
var EC = require('elliptic').ec;
// Create and initialize EC context
// (better do it once and reuse it)
var ec = new EC('secp256k1');
// Generate keys
var key = ec.genKeyPair();
// Sign the message's hash (input must be an array, or a hex-string)
var msgHash = [ 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10 ];
var signature = key.sign(msgHash);
// Export DER encoded signature in Array
var derSign = signature.toDER();
// Verify signature
console.log(key.verify(msgHash, derSign));
// CHECK WITH NO PRIVATE KEY
var pubPoint = key.getPublic();
var x = pubPoint.getX();
var y = pubPoint.getY();
// Public Key MUST be either:
// 1) '04' + hex string of x + hex string of y; or
// 2) object with two hex string properties (x and y); or
// 3) object with two buffer properties (x and y)
var pub = pubPoint.encode('hex'); // case 1
var pub = { x: x.toString('hex'), y: y.toString('hex') }; // case 2
var pub = { x: x.toBuffer(), y: y.toBuffer() }; // case 3
var pub = { x: x.toArrayLike(Buffer), y: y.toArrayLike(Buffer) }; // case 3
// Import public key
var key = ec.keyFromPublic(pub, 'hex');
// Signature MUST be either:
// 1) DER-encoded signature as hex-string; or
// 2) DER-encoded signature as buffer; or
// 3) object with two hex-string properties (r and s); or
// 4) object with two buffer properties (r and s)
var signature = '3046022100...'; // case 1
var signature = new Buffer('...'); // case 2
var signature = { r: 'b1fc...', s: '9c42...' }; // case 3
// Verify signature
console.log(key.verify(msgHash, signature));
EdDSA
var EdDSA = require('elliptic').eddsa;
// Create and initialize EdDSA context
// (better do it once and reuse it)
var ec = new EdDSA('ed25519');
// Create key pair from secret
var key = ec.keyFromSecret('693e3c...'); // hex string, array or Buffer
// Sign the message's hash (input must be an array, or a hex-string)
var msgHash = [ 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, 10 ];
var signature = key.sign(msgHash).toHex();
// Verify signature
console.log(key.verify(msgHash, signature));
// CHECK WITH NO PRIVATE KEY
// Import public key
var pub = '0a1af638...';
var key = ec.keyFromPublic(pub, 'hex');
// Verify signature
var signature = '70bed1...';
console.log(key.verify(msgHash, signature));
ECDH
var EC = require('elliptic').ec;
var ec = new EC('curve25519');
// Generate keys
var key1 = ec.genKeyPair();
var key2 = ec.genKeyPair();
var shared1 = key1.derive(key2.getPublic());
var shared2 = key2.derive(key1.getPublic());
console.log('Both shared secrets are BN instances');
console.log(shared1.toString(16));
console.log(shared2.toString(16));
three and more members:
var EC = require('elliptic').ec;
var ec = new EC('curve25519');
var A = ec.genKeyPair();
var B = ec.genKeyPair();
var C = ec.genKeyPair();
var AB = A.getPublic().mul(B.getPrivate())
var BC = B.getPublic().mul(C.getPrivate())
var CA = C.getPublic().mul(A.getPrivate())
var ABC = AB.mul(C.getPrivate())
var BCA = BC.mul(A.getPrivate())
var CAB = CA.mul(B.getPrivate())
console.log(ABC.getX().toString(16))
console.log(BCA.getX().toString(16))
console.log(CAB.getX().toString(16))
NOTE: .derive()
returns a BN instance.
Supported curves
Elliptic.js support following curve types:
- Short Weierstrass
- Montgomery
- Edwards
- Twisted Edwards
Following curve 'presets' are embedded into the library:
secp256k1
p192
p224
p256
p384
p521
curve25519
ed25519
NOTE: That curve25519
could not be used for ECDSA, use ed25519
instead.
Implementation details
ECDSA is using deterministic k
value generation as per RFC6979. Most of
the curve operations are performed on non-affine coordinates (either projective
or extended), various windowing techniques are used for different cases.
All operations are performed in reduction context using bn.js, hashing is provided by hash.js
Related projects
- eccrypto: isomorphic implementation of ECDSA, ECDH and ECIES for both
browserify and node (uses
elliptic
for browser and secp256k1-node for node)
LICENSE
This software is licensed under the MIT License.
Copyright Fedor Indutny, 2014.
Permission is hereby granted, free of charge, to any person obtaining a copy of this software and associated documentation files (the "Software"), to deal in the Software without restriction, including without limitation the rights to use, copy, modify, merge, publish, distribute, sublicense, and/or sell copies of the Software, and to permit persons to whom the Software is furnished to do so, subject to the following conditions:
The above copyright notice and this permission notice shall be included in all copies or substantial portions of the Software.
THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE SOFTWARE.