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"""RSA module
Module for calculating large primes, and RSA encryption, decryption,
signing and verification. Includes generating public and private keys.
WARNING: this implementation does not use random padding, compression of the
cleartext input to prevent repetitions, or other common security improvements.
Use with care.
"""
__author__ = "Sybren Stuvel, Marloes de Boer, Ivo Tamboer, and Barry Mead"
__date__ = "2010-02-08"
__version__ = '2.0'
import math
import os
import random
import sys
import types
from rsa._compat import byte
# Display a warning that this insecure version is imported.
import warnings
warnings.warn('Insecure version of the RSA module is imported as %s' % __name__)
def bit_size(number):
"""Returns the number of bits required to hold a specific long number"""
return int(math.ceil(math.log(number,2)))
def gcd(p, q):
"""Returns the greatest common divisor of p and q
>>> gcd(48, 180)
12
"""
# Iterateive Version is faster and uses much less stack space
while q != 0:
if p < q: (p,q) = (q,p)
(p,q) = (q, p % q)
return p
def bytes2int(bytes):
"""Converts a list of bytes or a string to an integer
>>> (((128 * 256) + 64) * 256) + 15
8405007
>>> l = [128, 64, 15]
>>> bytes2int(l) #same as bytes2int('\x80@\x0f')
8405007
"""
if not (type(bytes) is types.ListType or type(bytes) is types.StringType):
raise TypeError("You must pass a string or a list")
# Convert byte stream to integer
integer = 0
for byte in bytes:
integer *= 256
if type(byte) is types.StringType: byte = ord(byte)
integer += byte
return integer
def int2bytes(number):
"""
Converts a number to a string of bytes
"""
if not (type(number) is types.LongType or type(number) is types.IntType):
raise TypeError("You must pass a long or an int")
string = ""
while number > 0:
string = "%s%s" % (byte(number & 0xFF), string)
number /= 256
return string
def to64(number):
"""Converts a number in the range of 0 to 63 into base 64 digit
character in the range of '0'-'9', 'A'-'Z', 'a'-'z','-','_'.
>>> to64(10)
'A'
"""
if not (type(number) is types.LongType or type(number) is types.IntType):
raise TypeError("You must pass a long or an int")
if 0 <= number <= 9: #00-09 translates to '0' - '9'
return byte(number + 48)
if 10 <= number <= 35:
return byte(number + 55) #10-35 translates to 'A' - 'Z'
if 36 <= number <= 61:
return byte(number + 61) #36-61 translates to 'a' - 'z'
if number == 62: # 62 translates to '-' (minus)
return byte(45)
if number == 63: # 63 translates to '_' (underscore)
return byte(95)
raise ValueError('Invalid Base64 value: %i' % number)
def from64(number):
"""Converts an ordinal character value in the range of
0-9,A-Z,a-z,-,_ to a number in the range of 0-63.
>>> from64(49)
1
"""
if not (type(number) is types.LongType or type(number) is types.IntType):
raise TypeError("You must pass a long or an int")
if 48 <= number <= 57: #ord('0') - ord('9') translates to 0-9
return(number - 48)
if 65 <= number <= 90: #ord('A') - ord('Z') translates to 10-35
return(number - 55)
if 97 <= number <= 122: #ord('a') - ord('z') translates to 36-61
return(number - 61)
if number == 45: #ord('-') translates to 62
return(62)
if number == 95: #ord('_') translates to 63
return(63)
raise ValueError('Invalid Base64 value: %i' % number)
def int2str64(number):
"""Converts a number to a string of base64 encoded characters in
the range of '0'-'9','A'-'Z,'a'-'z','-','_'.
>>> int2str64(123456789)
'7MyqL'
"""
if not (type(number) is types.LongType or type(number) is types.IntType):
raise TypeError("You must pass a long or an int")
string = ""
while number > 0:
string = "%s%s" % (to64(number & 0x3F), string)
number /= 64
return string
def str642int(string):
"""Converts a base64 encoded string into an integer.
The chars of this string in in the range '0'-'9','A'-'Z','a'-'z','-','_'
>>> str642int('7MyqL')
123456789
"""
if not (type(string) is types.ListType or type(string) is types.StringType):
raise TypeError("You must pass a string or a list")
integer = 0
for byte in string:
integer *= 64
if type(byte) is types.StringType: byte = ord(byte)
integer += from64(byte)
return integer
def read_random_int(nbits):
"""Reads a random integer of approximately nbits bits rounded up
to whole bytes"""
nbytes = int(math.ceil(nbits/8.))
randomdata = os.urandom(nbytes)
return bytes2int(randomdata)
def randint(minvalue, maxvalue):
"""Returns a random integer x with minvalue <= x <= maxvalue"""
# Safety - get a lot of random data even if the range is fairly
# small
min_nbits = 32
# The range of the random numbers we need to generate
range = (maxvalue - minvalue) + 1
# Which is this number of bytes
rangebytes = ((bit_size(range) + 7) / 8)
# Convert to bits, but make sure it's always at least min_nbits*2
rangebits = max(rangebytes * 8, min_nbits * 2)
# Take a random number of bits between min_nbits and rangebits
nbits = random.randint(min_nbits, rangebits)
return (read_random_int(nbits) % range) + minvalue
def jacobi(a, b):
"""Calculates the value of the Jacobi symbol (a/b)
where both a and b are positive integers, and b is odd
"""
if a == 0: return 0
result = 1
while a > 1:
if a & 1:
if ((a-1)*(b-1) >> 2) & 1:
result = -result
a, b = b % a, a
else:
if (((b * b) - 1) >> 3) & 1:
result = -result
a >>= 1
if a == 0: return 0
return result
def jacobi_witness(x, n):
"""Returns False if n is an Euler pseudo-prime with base x, and
True otherwise.
"""
j = jacobi(x, n) % n
f = pow(x, (n-1)/2, n)
if j == f: return False
return True
def randomized_primality_testing(n, k):
"""Calculates whether n is composite (which is always correct) or
prime (which is incorrect with error probability 2**-k)
Returns False if the number is composite, and True if it's
probably prime.
"""
# 50% of Jacobi-witnesses can report compositness of non-prime numbers
for i in range(k):
x = randint(1, n-1)
if jacobi_witness(x, n): return False
return True
def is_prime(number):
"""Returns True if the number is prime, and False otherwise.
>>> is_prime(42)
0
>>> is_prime(41)
1
"""
if randomized_primality_testing(number, 6):
# Prime, according to Jacobi
return True
# Not prime
return False
def getprime(nbits):
"""Returns a prime number of max. 'math.ceil(nbits/8)*8' bits. In
other words: nbits is rounded up to whole bytes.
>>> p = getprime(8)
>>> is_prime(p-1)
0
>>> is_prime(p)
1
>>> is_prime(p+1)
0
"""
while True:
integer = read_random_int(nbits)
# Make sure it's odd
integer |= 1
# Test for primeness
if is_prime(integer): break
# Retry if not prime
return integer
def are_relatively_prime(a, b):
"""Returns True if a and b are relatively prime, and False if they
are not.
>>> are_relatively_prime(2, 3)
1
>>> are_relatively_prime(2, 4)
0
"""
d = gcd(a, b)
return (d == 1)
def find_p_q(nbits):
"""Returns a tuple of two different primes of nbits bits"""
pbits = nbits + (nbits/16) #Make sure that p and q aren't too close
qbits = nbits - (nbits/16) #or the factoring programs can factor n
p = getprime(pbits)
while True:
q = getprime(qbits)
#Make sure p and q are different.
if not q == p: break
return (p, q)
def extended_gcd(a, b):
"""Returns a tuple (r, i, j) such that r = gcd(a, b) = ia + jb
"""
# r = gcd(a,b) i = multiplicitive inverse of a mod b
# or j = multiplicitive inverse of b mod a
# Neg return values for i or j are made positive mod b or a respectively
# Iterateive Version is faster and uses much less stack space
x = 0
y = 1
lx = 1
ly = 0
oa = a #Remember original a/b to remove
ob = b #negative values from return results
while b != 0:
q = long(a/b)
(a, b) = (b, a % b)
(x, lx) = ((lx - (q * x)),x)
(y, ly) = ((ly - (q * y)),y)
if (lx < 0): lx += ob #If neg wrap modulo orignal b
if (ly < 0): ly += oa #If neg wrap modulo orignal a
return (a, lx, ly) #Return only positive values
# Main function: calculate encryption and decryption keys
def calculate_keys(p, q, nbits):
"""Calculates an encryption and a decryption key for p and q, and
returns them as a tuple (e, d)"""
n = p * q
phi_n = (p-1) * (q-1)
while True:
# Make sure e has enough bits so we ensure "wrapping" through
# modulo n
e = max(65537,getprime(nbits/4))
if are_relatively_prime(e, n) and are_relatively_prime(e, phi_n): break
(d, i, j) = extended_gcd(e, phi_n)
if not d == 1:
raise Exception("e (%d) and phi_n (%d) are not relatively prime" % (e, phi_n))
if (i < 0):
raise Exception("New extended_gcd shouldn't return negative values")
if not (e * i) % phi_n == 1:
raise Exception("e (%d) and i (%d) are not mult. inv. modulo phi_n (%d)" % (e, i, phi_n))
return (e, i)
def gen_keys(nbits):
"""Generate RSA keys of nbits bits. Returns (p, q, e, d).
Note: this can take a long time, depending on the key size.
"""
(p, q) = find_p_q(nbits)
(e, d) = calculate_keys(p, q, nbits)
return (p, q, e, d)
def newkeys(nbits):
"""Generates public and private keys, and returns them as (pub,
priv).
The public key consists of a dict {e: ..., , n: ....). The private
key consists of a dict {d: ...., p: ...., q: ....).
"""
nbits = max(9,nbits) # Don't let nbits go below 9 bits
(p, q, e, d) = gen_keys(nbits)
return ( {'e': e, 'n': p*q}, {'d': d, 'p': p, 'q': q} )
def encrypt_int(message, ekey, n):
"""Encrypts a message using encryption key 'ekey', working modulo n"""
if type(message) is types.IntType:
message = long(message)
if not type(message) is types.LongType:
raise TypeError("You must pass a long or int")
if message < 0 or message > n:
raise OverflowError("The message is too long")
#Note: Bit exponents start at zero (bit counts start at 1) this is correct
safebit = bit_size(n) - 2 #compute safe bit (MSB - 1)
message += (1 << safebit) #add safebit to ensure folding
return pow(message, ekey, n)
def decrypt_int(cyphertext, dkey, n):
"""Decrypts a cypher text using the decryption key 'dkey', working
modulo n"""
message = pow(cyphertext, dkey, n)
safebit = bit_size(n) - 2 #compute safe bit (MSB - 1)
message -= (1 << safebit) #remove safebit before decode
return message
def encode64chops(chops):
"""base64encodes chops and combines them into a ',' delimited string"""
chips = [] #chips are character chops
for value in chops:
chips.append(int2str64(value))
#delimit chops with comma
encoded = ','.join(chips)
return encoded
def decode64chops(string):
"""base64decodes and makes a ',' delimited string into chops"""
chips = string.split(',') #split chops at commas
chops = []
for string in chips: #make char chops (chips) into chops
chops.append(str642int(string))
return chops
def chopstring(message, key, n, funcref):
"""Chops the 'message' into integers that fit into n,
leaving room for a safebit to be added to ensure that all
messages fold during exponentiation. The MSB of the number n
is not independant modulo n (setting it could cause overflow), so
use the next lower bit for the safebit. Therefore reserve 2-bits
in the number n for non-data bits. Calls specified encryption
function for each chop.
Used by 'encrypt' and 'sign'.
"""
msglen = len(message)
mbits = msglen * 8
#Set aside 2-bits so setting of safebit won't overflow modulo n.
nbits = bit_size(n) - 2 # leave room for safebit
nbytes = nbits / 8
blocks = msglen / nbytes
if msglen % nbytes > 0:
blocks += 1
cypher = []
for bindex in range(blocks):
offset = bindex * nbytes
block = message[offset:offset+nbytes]
value = bytes2int(block)
cypher.append(funcref(value, key, n))
return encode64chops(cypher) #Encode encrypted ints to base64 strings
def gluechops(string, key, n, funcref):
"""Glues chops back together into a string. calls
funcref(integer, key, n) for each chop.
Used by 'decrypt' and 'verify'.
"""
message = ""
chops = decode64chops(string) #Decode base64 strings into integer chops
for cpart in chops:
mpart = funcref(cpart, key, n) #Decrypt each chop
message += int2bytes(mpart) #Combine decrypted strings into a msg
return message
def encrypt(message, key):
"""Encrypts a string 'message' with the public key 'key'"""
if 'n' not in key:
raise Exception("You must use the public key with encrypt")
return chopstring(message, key['e'], key['n'], encrypt_int)
def sign(message, key):
"""Signs a string 'message' with the private key 'key'"""
if 'p' not in key:
raise Exception("You must use the private key with sign")
return chopstring(message, key['d'], key['p']*key['q'], encrypt_int)
def decrypt(cypher, key):
"""Decrypts a string 'cypher' with the private key 'key'"""
if 'p' not in key:
raise Exception("You must use the private key with decrypt")
return gluechops(cypher, key['d'], key['p']*key['q'], decrypt_int)
def verify(cypher, key):
"""Verifies a string 'cypher' with the public key 'key'"""
if 'n' not in key:
raise Exception("You must use the public key with verify")
return gluechops(cypher, key['e'], key['n'], decrypt_int)
# Do doctest if we're not imported
if __name__ == "__main__":
import doctest
doctest.testmod()
__all__ = ["newkeys", "encrypt", "decrypt", "sign", "verify"]
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