719 lines
30 KiB
Python
719 lines
30 KiB
Python
# -*- coding: utf-8 -*-
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#
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# PublicKey/RSA.py : RSA public key primitive
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#
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# Written in 2008 by Dwayne C. Litzenberger <dlitz@dlitz.net>
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#
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# ===================================================================
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# The contents of this file are dedicated to the public domain. To
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# the extent that dedication to the public domain is not available,
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# everyone is granted a worldwide, perpetual, royalty-free,
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# non-exclusive license to exercise all rights associated with the
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# contents of this file for any purpose whatsoever.
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# No rights are reserved.
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#
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# THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND,
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# EXPRESS OR IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF
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# MERCHANTABILITY, FITNESS FOR A PARTICULAR PURPOSE AND
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# NONINFRINGEMENT. IN NO EVENT SHALL THE AUTHORS OR COPYRIGHT HOLDERS
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# BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER LIABILITY, WHETHER IN AN
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# ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING FROM, OUT OF OR IN
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# CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS IN THE
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# SOFTWARE.
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# ===================================================================
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"""RSA public-key cryptography algorithm (signature and encryption).
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RSA_ is the most widespread and used public key algorithm. Its security is
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based on the difficulty of factoring large integers. The algorithm has
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withstood attacks for 30 years, and it is therefore considered reasonably
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secure for new designs.
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The algorithm can be used for both confidentiality (encryption) and
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authentication (digital signature). It is worth noting that signing and
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decryption are significantly slower than verification and encryption.
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The cryptograhic strength is primarily linked to the length of the modulus *n*.
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In 2012, a sufficient length is deemed to be 2048 bits. For more information,
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see the most recent ECRYPT_ report.
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Both RSA ciphertext and RSA signature are as big as the modulus *n* (256
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bytes if *n* is 2048 bit long).
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This module provides facilities for generating fresh, new RSA keys, constructing
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them from known components, exporting them, and importing them.
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>>> from Crypto.PublicKey import RSA
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>>>
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>>> key = RSA.generate(2048)
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>>> f = open('mykey.pem','w')
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>>> f.write(RSA.exportKey('PEM'))
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>>> f.close()
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...
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>>> f = open('mykey.pem','r')
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>>> key = RSA.importKey(f.read())
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Even though you may choose to directly use the methods of an RSA key object
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to perform the primitive cryptographic operations (e.g. `_RSAobj.encrypt`),
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it is recommended to use one of the standardized schemes instead (like
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`Crypto.Cipher.PKCS1_v1_5` or `Crypto.Signature.PKCS1_v1_5`).
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.. _RSA: http://en.wikipedia.org/wiki/RSA_%28algorithm%29
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.. _ECRYPT: http://www.ecrypt.eu.org/documents/D.SPA.17.pdf
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:sort: generate,construct,importKey,error
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"""
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__revision__ = "$Id$"
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__all__ = ['generate', 'construct', 'error', 'importKey', 'RSAImplementation', '_RSAobj']
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import sys
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if sys.version_info[0] == 2 and sys.version_info[1] == 1:
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from Crypto.Util.py21compat import *
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from Crypto.Util.py3compat import *
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#from Crypto.Util.python_compat import *
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from Crypto.Util.number import getRandomRange, bytes_to_long, long_to_bytes
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from Crypto.PublicKey import _RSA, _slowmath, pubkey
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from Crypto import Random
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from Crypto.Util.asn1 import DerObject, DerSequence, DerNull
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import binascii
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import struct
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from Crypto.Util.number import inverse
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from Crypto.Util.number import inverse
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try:
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from Crypto.PublicKey import _fastmath
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except ImportError:
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_fastmath = None
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class _RSAobj(pubkey.pubkey):
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"""Class defining an actual RSA key.
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:undocumented: __getstate__, __setstate__, __repr__, __getattr__
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"""
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#: Dictionary of RSA parameters.
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#:
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#: A public key will only have the following entries:
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#:
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#: - **n**, the modulus.
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#: - **e**, the public exponent.
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#:
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#: A private key will also have:
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#:
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#: - **d**, the private exponent.
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#: - **p**, the first factor of n.
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#: - **q**, the second factor of n.
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#: - **u**, the CRT coefficient (1/p) mod q.
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keydata = ['n', 'e', 'd', 'p', 'q', 'u']
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def __init__(self, implementation, key, randfunc=None):
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self.implementation = implementation
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self.key = key
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if randfunc is None:
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randfunc = Random.new().read
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self._randfunc = randfunc
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def __getattr__(self, attrname):
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if attrname in self.keydata:
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# For backward compatibility, allow the user to get (not set) the
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# RSA key parameters directly from this object.
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return getattr(self.key, attrname)
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else:
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raise AttributeError("%s object has no %r attribute" % (self.__class__.__name__, attrname,))
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def encrypt(self, plaintext, K):
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"""Encrypt a piece of data with RSA.
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:Parameter plaintext: The piece of data to encrypt with RSA. It may not
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be numerically larger than the RSA module (**n**).
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:Type plaintext: byte string or long
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:Parameter K: A random parameter (*for compatibility only. This
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value will be ignored*)
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:Type K: byte string or long
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:attention: this function performs the plain, primitive RSA encryption
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(*textbook*). In real applications, you always need to use proper
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cryptographic padding, and you should not directly encrypt data with
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this method. Failure to do so may lead to security vulnerabilities.
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It is recommended to use modules
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`Crypto.Cipher.PKCS1_OAEP` or `Crypto.Cipher.PKCS1_v1_5` instead.
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:Return: A tuple with two items. The first item is the ciphertext
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of the same type as the plaintext (string or long). The second item
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is always None.
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"""
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return pubkey.pubkey.encrypt(self, plaintext, K)
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def decrypt(self, ciphertext):
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"""Decrypt a piece of data with RSA.
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Decryption always takes place with blinding.
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:attention: this function performs the plain, primitive RSA decryption
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(*textbook*). In real applications, you always need to use proper
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cryptographic padding, and you should not directly decrypt data with
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this method. Failure to do so may lead to security vulnerabilities.
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It is recommended to use modules
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`Crypto.Cipher.PKCS1_OAEP` or `Crypto.Cipher.PKCS1_v1_5` instead.
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:Parameter ciphertext: The piece of data to decrypt with RSA. It may
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not be numerically larger than the RSA module (**n**). If a tuple,
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the first item is the actual ciphertext; the second item is ignored.
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:Type ciphertext: byte string, long or a 2-item tuple as returned by
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`encrypt`
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:Return: A byte string if ciphertext was a byte string or a tuple
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of byte strings. A long otherwise.
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"""
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return pubkey.pubkey.decrypt(self, ciphertext)
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def sign(self, M, K):
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"""Sign a piece of data with RSA.
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Signing always takes place with blinding.
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:attention: this function performs the plain, primitive RSA decryption
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(*textbook*). In real applications, you always need to use proper
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cryptographic padding, and you should not directly sign data with
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this method. Failure to do so may lead to security vulnerabilities.
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It is recommended to use modules
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`Crypto.Signature.PKCS1_PSS` or `Crypto.Signature.PKCS1_v1_5` instead.
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:Parameter M: The piece of data to sign with RSA. It may
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not be numerically larger than the RSA module (**n**).
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:Type M: byte string or long
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:Parameter K: A random parameter (*for compatibility only. This
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value will be ignored*)
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:Type K: byte string or long
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:Return: A 2-item tuple. The first item is the actual signature (a
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long). The second item is always None.
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"""
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return pubkey.pubkey.sign(self, M, K)
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def verify(self, M, signature):
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"""Verify the validity of an RSA signature.
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:attention: this function performs the plain, primitive RSA encryption
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(*textbook*). In real applications, you always need to use proper
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cryptographic padding, and you should not directly verify data with
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this method. Failure to do so may lead to security vulnerabilities.
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It is recommended to use modules
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`Crypto.Signature.PKCS1_PSS` or `Crypto.Signature.PKCS1_v1_5` instead.
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:Parameter M: The expected message.
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:Type M: byte string or long
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:Parameter signature: The RSA signature to verify. The first item of
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the tuple is the actual signature (a long not larger than the modulus
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**n**), whereas the second item is always ignored.
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:Type signature: A 2-item tuple as return by `sign`
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:Return: True if the signature is correct, False otherwise.
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"""
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return pubkey.pubkey.verify(self, M, signature)
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def _encrypt(self, c, K):
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return (self.key._encrypt(c),)
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def _decrypt(self, c):
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#(ciphertext,) = c
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(ciphertext,) = c[:1] # HACK - We should use the previous line
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# instead, but this is more compatible and we're
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# going to replace the Crypto.PublicKey API soon
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# anyway.
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# Blinded RSA decryption (to prevent timing attacks):
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# Step 1: Generate random secret blinding factor r, such that 0 < r < n-1
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r = getRandomRange(1, self.key.n-1, randfunc=self._randfunc)
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# Step 2: Compute c' = c * r**e mod n
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cp = self.key._blind(ciphertext, r)
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# Step 3: Compute m' = c'**d mod n (ordinary RSA decryption)
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mp = self.key._decrypt(cp)
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# Step 4: Compute m = m**(r-1) mod n
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return self.key._unblind(mp, r)
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def _blind(self, m, r):
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return self.key._blind(m, r)
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def _unblind(self, m, r):
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return self.key._unblind(m, r)
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def _sign(self, m, K=None):
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return (self.key._sign(m),)
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def _verify(self, m, sig):
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#(s,) = sig
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(s,) = sig[:1] # HACK - We should use the previous line instead, but
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# this is more compatible and we're going to replace
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# the Crypto.PublicKey API soon anyway.
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return self.key._verify(m, s)
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def has_private(self):
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return self.key.has_private()
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def size(self):
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return self.key.size()
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def can_blind(self):
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return True
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def can_encrypt(self):
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return True
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def can_sign(self):
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return True
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def publickey(self):
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return self.implementation.construct((self.key.n, self.key.e))
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def __getstate__(self):
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d = {}
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for k in self.keydata:
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try:
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d[k] = getattr(self.key, k)
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except AttributeError:
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pass
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return d
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def __setstate__(self, d):
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if not hasattr(self, 'implementation'):
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self.implementation = RSAImplementation()
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t = []
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for k in self.keydata:
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if k not in d:
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break
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t.append(d[k])
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self.key = self.implementation._math.rsa_construct(*tuple(t))
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def __repr__(self):
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attrs = []
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for k in self.keydata:
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if k == 'n':
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attrs.append("n(%d)" % (self.size()+1,))
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elif hasattr(self.key, k):
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attrs.append(k)
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if self.has_private():
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attrs.append("private")
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# PY3K: This is meant to be text, do not change to bytes (data)
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return "<%s @0x%x %s>" % (self.__class__.__name__, id(self), ",".join(attrs))
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def exportKey(self, format='PEM', passphrase=None, pkcs=1):
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"""Export this RSA key.
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:Parameter format: The format to use for wrapping the key.
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- *'DER'*. Binary encoding, always unencrypted.
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- *'PEM'*. Textual encoding, done according to `RFC1421`_/`RFC1423`_.
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Unencrypted (default) or encrypted.
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- *'OpenSSH'*. Textual encoding, done according to OpenSSH specification.
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Only suitable for public keys (not private keys).
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:Type format: string
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:Parameter passphrase: In case of PEM, the pass phrase to derive the encryption key from.
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:Type passphrase: string
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:Parameter pkcs: The PKCS standard to follow for assembling the key.
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You have two choices:
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- with **1**, the public key is embedded into an X.509 `SubjectPublicKeyInfo` DER SEQUENCE.
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The private key is embedded into a `PKCS#1`_ `RSAPrivateKey` DER SEQUENCE.
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This mode is the default.
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- with **8**, the private key is embedded into a `PKCS#8`_ `PrivateKeyInfo` DER SEQUENCE.
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This mode is not available for public keys.
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PKCS standards are not relevant for the *OpenSSH* format.
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:Type pkcs: integer
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:Return: A byte string with the encoded public or private half.
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:Raise ValueError:
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When the format is unknown.
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.. _RFC1421: http://www.ietf.org/rfc/rfc1421.txt
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.. _RFC1423: http://www.ietf.org/rfc/rfc1423.txt
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.. _`PKCS#1`: http://www.ietf.org/rfc/rfc3447.txt
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.. _`PKCS#8`: http://www.ietf.org/rfc/rfc5208.txt
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"""
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if passphrase is not None:
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passphrase = tobytes(passphrase)
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if format=='OpenSSH':
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eb = long_to_bytes(self.e)
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nb = long_to_bytes(self.n)
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if bord(eb[0]) & 0x80: eb=bchr(0x00)+eb
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if bord(nb[0]) & 0x80: nb=bchr(0x00)+nb
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keyparts = [ 'ssh-rsa', eb, nb ]
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keystring = ''.join([ struct.pack(">I",len(kp))+kp for kp in keyparts])
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return 'ssh-rsa '+binascii.b2a_base64(keystring)[:-1]
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# DER format is always used, even in case of PEM, which simply
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# encodes it into BASE64.
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der = DerSequence()
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if self.has_private():
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keyType= { 1: 'RSA PRIVATE', 8: 'PRIVATE' }[pkcs]
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der[:] = [ 0, self.n, self.e, self.d, self.p, self.q,
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self.d % (self.p-1), self.d % (self.q-1),
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inverse(self.q, self.p) ]
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if pkcs==8:
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derkey = der.encode()
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der = DerSequence([0])
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der.append(algorithmIdentifier)
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der.append(DerObject('OCTET STRING', derkey).encode())
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else:
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keyType = "PUBLIC"
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der.append(algorithmIdentifier)
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bitmap = DerObject('BIT STRING')
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derPK = DerSequence( [ self.n, self.e ] )
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bitmap.payload = bchr(0x00) + derPK.encode()
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der.append(bitmap.encode())
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if format=='DER':
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return der.encode()
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if format=='PEM':
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pem = b("-----BEGIN " + keyType + " KEY-----\n")
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objenc = None
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if passphrase and keyType.endswith('PRIVATE'):
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# We only support 3DES for encryption
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import Crypto.Hash.MD5
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from Crypto.Cipher import DES3
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from Crypto.Protocol.KDF import PBKDF1
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salt = self._randfunc(8)
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key = PBKDF1(passphrase, salt, 16, 1, Crypto.Hash.MD5)
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key += PBKDF1(key+passphrase, salt, 8, 1, Crypto.Hash.MD5)
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objenc = DES3.new(key, Crypto.Cipher.DES3.MODE_CBC, salt)
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pem += b('Proc-Type: 4,ENCRYPTED\n')
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pem += b('DEK-Info: DES-EDE3-CBC,') + binascii.b2a_hex(salt).upper() + b('\n\n')
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binaryKey = der.encode()
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if objenc:
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# Add PKCS#7-like padding
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padding = objenc.block_size-len(binaryKey)%objenc.block_size
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binaryKey = objenc.encrypt(binaryKey+bchr(padding)*padding)
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# Each BASE64 line can take up to 64 characters (=48 bytes of data)
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chunks = [ binascii.b2a_base64(binaryKey[i:i+48]) for i in range(0, len(binaryKey), 48) ]
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pem += b('').join(chunks)
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pem += b("-----END " + keyType + " KEY-----")
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return pem
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return ValueError("Unknown key format '%s'. Cannot export the RSA key." % format)
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|
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class RSAImplementation(object):
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"""
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An RSA key factory.
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This class is only internally used to implement the methods of the `Crypto.PublicKey.RSA` module.
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:sort: __init__,generate,construct,importKey
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:undocumented: _g*, _i*
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"""
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|
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def __init__(self, **kwargs):
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"""Create a new RSA key factory.
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:Keywords:
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use_fast_math : bool
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Specify which mathematic library to use:
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- *None* (default). Use fastest math available.
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- *True* . Use fast math.
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- *False* . Use slow math.
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default_randfunc : callable
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Specify how to collect random data:
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- *None* (default). Use Random.new().read().
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- not *None* . Use the specified function directly.
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:Raise RuntimeError:
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When **use_fast_math** =True but fast math is not available.
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"""
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use_fast_math = kwargs.get('use_fast_math', None)
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if use_fast_math is None: # Automatic
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if _fastmath is not None:
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self._math = _fastmath
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else:
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self._math = _slowmath
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elif use_fast_math: # Explicitly select fast math
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if _fastmath is not None:
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self._math = _fastmath
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else:
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raise RuntimeError("fast math module not available")
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else: # Explicitly select slow math
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self._math = _slowmath
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self.error = self._math.error
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self._default_randfunc = kwargs.get('default_randfunc', None)
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self._current_randfunc = None
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def _get_randfunc(self, randfunc):
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if randfunc is not None:
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return randfunc
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elif self._current_randfunc is None:
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self._current_randfunc = Random.new().read
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return self._current_randfunc
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def generate(self, bits, randfunc=None, progress_func=None, e=65537):
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"""Randomly generate a fresh, new RSA key.
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:Parameters:
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bits : int
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Key length, or size (in bits) of the RSA modulus.
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It must be a multiple of 256, and no smaller than 1024.
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randfunc : callable
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Random number generation function; it should accept
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a single integer N and return a string of random data
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N bytes long.
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If not specified, a new one will be instantiated
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from ``Crypto.Random``.
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progress_func : callable
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Optional function that will be called with a short string
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containing the key parameter currently being generated;
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|
it's useful for interactive applications where a user is
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waiting for a key to be generated.
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e : int
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Public RSA exponent. It must be an odd positive integer.
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|
It is typically a small number with very few ones in its
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binary representation.
|
|
The default value 65537 (= ``0b10000000000000001`` ) is a safe
|
|
choice: other common values are 5, 7, 17, and 257.
|
|
|
|
:attention: You should always use a cryptographically secure random number generator,
|
|
such as the one defined in the ``Crypto.Random`` module; **don't** just use the
|
|
current time and the ``random`` module.
|
|
|
|
:attention: Exponent 3 is also widely used, but it requires very special care when padding
|
|
the message.
|
|
|
|
:Return: An RSA key object (`_RSAobj`).
|
|
|
|
:Raise ValueError:
|
|
When **bits** is too little or not a multiple of 256, or when
|
|
**e** is not odd or smaller than 2.
|
|
"""
|
|
if bits < 1024 or (bits & 0xff) != 0:
|
|
# pubkey.getStrongPrime doesn't like anything that's not a multiple of 256 and >= 1024
|
|
raise ValueError("RSA modulus length must be a multiple of 256 and >= 1024")
|
|
if e%2==0 or e<3:
|
|
raise ValueError("RSA public exponent must be a positive, odd integer larger than 2.")
|
|
rf = self._get_randfunc(randfunc)
|
|
obj = _RSA.generate_py(bits, rf, progress_func, e) # TODO: Don't use legacy _RSA module
|
|
key = self._math.rsa_construct(obj.n, obj.e, obj.d, obj.p, obj.q, obj.u)
|
|
return _RSAobj(self, key)
|
|
|
|
def construct(self, tup):
|
|
"""Construct an RSA key from a tuple of valid RSA components.
|
|
|
|
The modulus **n** must be the product of two primes.
|
|
The public exponent **e** must be odd and larger than 1.
|
|
|
|
In case of a private key, the following equations must apply:
|
|
|
|
- e != 1
|
|
- p*q = n
|
|
- e*d = 1 mod (p-1)(q-1)
|
|
- p*u = 1 mod q
|
|
|
|
:Parameters:
|
|
tup : tuple
|
|
A tuple of long integers, with at least 2 and no
|
|
more than 6 items. The items come in the following order:
|
|
|
|
1. RSA modulus (n).
|
|
2. Public exponent (e).
|
|
3. Private exponent (d). Only required if the key is private.
|
|
4. First factor of n (p). Optional.
|
|
5. Second factor of n (q). Optional.
|
|
6. CRT coefficient, (1/p) mod q (u). Optional.
|
|
|
|
:Return: An RSA key object (`_RSAobj`).
|
|
"""
|
|
key = self._math.rsa_construct(*tup)
|
|
return _RSAobj(self, key)
|
|
|
|
def _importKeyDER(self, externKey):
|
|
"""Import an RSA key (public or private half), encoded in DER form."""
|
|
|
|
try:
|
|
|
|
der = DerSequence()
|
|
der.decode(externKey, True)
|
|
|
|
# Try PKCS#1 first, for a private key
|
|
if len(der)==9 and der.hasOnlyInts() and der[0]==0:
|
|
# ASN.1 RSAPrivateKey element
|
|
del der[6:] # Remove d mod (p-1), d mod (q-1), and q^{-1} mod p
|
|
der.append(inverse(der[4],der[5])) # Add p^{-1} mod q
|
|
del der[0] # Remove version
|
|
return self.construct(der[:])
|
|
|
|
# Keep on trying PKCS#1, but now for a public key
|
|
if len(der)==2:
|
|
# The DER object is an RSAPublicKey SEQUENCE with two elements
|
|
if der.hasOnlyInts():
|
|
return self.construct(der[:])
|
|
# The DER object is a SubjectPublicKeyInfo SEQUENCE with two elements:
|
|
# an 'algorithm' (or 'algorithmIdentifier') SEQUENCE and a 'subjectPublicKey' BIT STRING.
|
|
# 'algorithm' takes the value given a few lines above.
|
|
# 'subjectPublicKey' encapsulates the actual ASN.1 RSAPublicKey element.
|
|
if der[0]==algorithmIdentifier:
|
|
bitmap = DerObject()
|
|
bitmap.decode(der[1], True)
|
|
if bitmap.isType('BIT STRING') and bord(bitmap.payload[0])==0x00:
|
|
der.decode(bitmap.payload[1:], True)
|
|
if len(der)==2 and der.hasOnlyInts():
|
|
return self.construct(der[:])
|
|
|
|
# Try unencrypted PKCS#8
|
|
if der[0]==0:
|
|
# The second element in the SEQUENCE is algorithmIdentifier.
|
|
# It must say RSA (see above for description).
|
|
if der[1]==algorithmIdentifier:
|
|
privateKey = DerObject()
|
|
privateKey.decode(der[2], True)
|
|
if privateKey.isType('OCTET STRING'):
|
|
return self._importKeyDER(privateKey.payload)
|
|
|
|
except ValueError as IndexError:
|
|
pass
|
|
|
|
raise ValueError("RSA key format is not supported")
|
|
|
|
def importKey(self, externKey, passphrase=None):
|
|
"""Import an RSA key (public or private half), encoded in standard form.
|
|
|
|
:Parameter externKey:
|
|
The RSA key to import, encoded as a string.
|
|
|
|
An RSA public key can be in any of the following formats:
|
|
|
|
- X.509 `subjectPublicKeyInfo` DER SEQUENCE (binary or PEM encoding)
|
|
- `PKCS#1`_ `RSAPublicKey` DER SEQUENCE (binary or PEM encoding)
|
|
- OpenSSH (textual public key only)
|
|
|
|
An RSA private key can be in any of the following formats:
|
|
|
|
- PKCS#1 `RSAPrivateKey` DER SEQUENCE (binary or PEM encoding)
|
|
- `PKCS#8`_ `PrivateKeyInfo` DER SEQUENCE (binary or PEM encoding)
|
|
- OpenSSH (textual public key only)
|
|
|
|
For details about the PEM encoding, see `RFC1421`_/`RFC1423`_.
|
|
|
|
In case of PEM encoding, the private key can be encrypted with DES or 3TDES according to a certain ``pass phrase``.
|
|
Only OpenSSL-compatible pass phrases are supported.
|
|
:Type externKey: string
|
|
|
|
:Parameter passphrase:
|
|
In case of an encrypted PEM key, this is the pass phrase from which the encryption key is derived.
|
|
:Type passphrase: string
|
|
|
|
:Return: An RSA key object (`_RSAobj`).
|
|
|
|
:Raise ValueError/IndexError/TypeError:
|
|
When the given key cannot be parsed (possibly because the pass phrase is wrong).
|
|
|
|
.. _RFC1421: http://www.ietf.org/rfc/rfc1421.txt
|
|
.. _RFC1423: http://www.ietf.org/rfc/rfc1423.txt
|
|
.. _`PKCS#1`: http://www.ietf.org/rfc/rfc3447.txt
|
|
.. _`PKCS#8`: http://www.ietf.org/rfc/rfc5208.txt
|
|
"""
|
|
externKey = tobytes(externKey)
|
|
if passphrase is not None:
|
|
passphrase = tobytes(passphrase)
|
|
|
|
if externKey.startswith(b('-----')):
|
|
# This is probably a PEM encoded key
|
|
lines = externKey.replace(b(" "),b('')).split()
|
|
keyobj = None
|
|
|
|
# The encrypted PEM format
|
|
if lines[1].startswith(b('Proc-Type:4,ENCRYPTED')):
|
|
DEK = lines[2].split(b(':'))
|
|
if len(DEK)!=2 or DEK[0]!=b('DEK-Info') or not passphrase:
|
|
raise ValueError("PEM encryption format not supported.")
|
|
algo, salt = DEK[1].split(b(','))
|
|
salt = binascii.a2b_hex(salt)
|
|
import Crypto.Hash.MD5
|
|
from Crypto.Cipher import DES, DES3
|
|
from Crypto.Protocol.KDF import PBKDF1
|
|
if algo==b("DES-CBC"):
|
|
# This is EVP_BytesToKey in OpenSSL
|
|
key = PBKDF1(passphrase, salt, 8, 1, Crypto.Hash.MD5)
|
|
keyobj = DES.new(key, Crypto.Cipher.DES.MODE_CBC, salt)
|
|
elif algo==b("DES-EDE3-CBC"):
|
|
# Note that EVP_BytesToKey is note exactly the same as PBKDF1
|
|
key = PBKDF1(passphrase, salt, 16, 1, Crypto.Hash.MD5)
|
|
key += PBKDF1(key+passphrase, salt, 8, 1, Crypto.Hash.MD5)
|
|
keyobj = DES3.new(key, Crypto.Cipher.DES3.MODE_CBC, salt)
|
|
else:
|
|
raise ValueError("Unsupport PEM encryption algorithm.")
|
|
lines = lines[2:]
|
|
|
|
der = binascii.a2b_base64(b('').join(lines[1:-1]))
|
|
if keyobj:
|
|
der = keyobj.decrypt(der)
|
|
padding = bord(der[-1])
|
|
der = der[:-padding]
|
|
return self._importKeyDER(der)
|
|
|
|
if externKey.startswith(b('ssh-rsa ')):
|
|
# This is probably an OpenSSH key
|
|
keystring = binascii.a2b_base64(externKey.split(b(' '))[1])
|
|
keyparts = []
|
|
while len(keystring)>4:
|
|
l = struct.unpack(">I",keystring[:4])[0]
|
|
keyparts.append(keystring[4:4+l])
|
|
keystring = keystring[4+l:]
|
|
e = bytes_to_long(keyparts[1])
|
|
n = bytes_to_long(keyparts[2])
|
|
return self.construct([n, e])
|
|
if bord(externKey[0])==0x30:
|
|
# This is probably a DER encoded key
|
|
return self._importKeyDER(externKey)
|
|
|
|
raise ValueError("RSA key format is not supported")
|
|
|
|
#: This is the ASN.1 DER object that qualifies an algorithm as
|
|
#: compliant to PKCS#1 (that is, the standard RSA).
|
|
# It is found in all 'algorithm' fields (also called 'algorithmIdentifier').
|
|
# It is a SEQUENCE with the oid assigned to RSA and with its parameters (none).
|
|
# 0x06 0x09 OBJECT IDENTIFIER, 9 bytes of payload
|
|
# 0x2A 0x86 0x48 0x86 0xF7 0x0D 0x01 0x01 0x01
|
|
# rsaEncryption (1 2 840 113549 1 1 1) (PKCS #1)
|
|
# 0x05 0x00 NULL
|
|
algorithmIdentifier = DerSequence(
|
|
[ b('\x06\x09\x2A\x86\x48\x86\xF7\x0D\x01\x01\x01'),
|
|
DerNull().encode() ]
|
|
).encode()
|
|
|
|
_impl = RSAImplementation()
|
|
#:
|
|
#: Randomly generate a fresh, new RSA key object.
|
|
#:
|
|
#: See `RSAImplementation.generate`.
|
|
#:
|
|
generate = _impl.generate
|
|
#:
|
|
#: Construct an RSA key object from a tuple of valid RSA components.
|
|
#:
|
|
#: See `RSAImplementation.construct`.
|
|
#:
|
|
construct = _impl.construct
|
|
#:
|
|
#: Import an RSA key (public or private half), encoded in standard form.
|
|
#:
|
|
#: See `RSAImplementation.importKey`.
|
|
#:
|
|
importKey = _impl.importKey
|
|
error = _impl.error
|
|
|
|
# vim:set ts=4 sw=4 sts=4 expandtab:
|
|
|