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known_phi.py
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known_phi.py
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from math import gcd
from math import isqrt
from random import randrange
from sage.all import is_prime
def factorize(N, phi):
"""
Recovers the prime factors from a modulus if Euler's totient is known.
This method only works for a modulus consisting of 2 primes!
:param N: the modulus
:param phi: Euler's totient, the order of the multiplicative group modulo N
:return: a tuple containing the prime factors, or None if the factors were not found
"""
s = N + 1 - phi
d = s ** 2 - 4 * N
p = int(s - isqrt(d)) // 2
q = int(s + isqrt(d)) // 2
return p, q if p * q == N else None
def factorize_multi_prime(N, phi):
"""
Recovers the prime factors from a modulus if Euler's totient is known.
This method works for a modulus consisting of any number of primes, but is considerably be slower than factorize.
More information: Hinek M. J., Low M. K., Teske E., "On Some Attacks on Multi-prime RSA" (Section 3)
:param N: the modulus
:param phi: Euler's totient, the order of the multiplicative group modulo N
:return: a tuple containing the prime factors
"""
prime_factors = set()
factors = [N]
while len(factors) > 0:
# Element to factorize.
N = factors[0]
w = randrange(2, N - 1)
i = 1
while phi % (2 ** i) == 0:
sqrt_1 = pow(w, phi // (2 ** i), N)
if sqrt_1 > 1 and sqrt_1 != N - 1:
# We can remove the element to factorize now, because we have a factorization.
factors = factors[1:]
p = gcd(N, sqrt_1 + 1)
q = N // p
if is_prime(p):
prime_factors.add(p)
elif p > 1:
factors.append(p)
if is_prime(q):
prime_factors.add(q)
elif q > 1:
factors.append(q)
# Continue in the outer loop
break
i += 1
return tuple(prime_factors)