The Miller-Rabin primality test or Rabin-Miller primality test is a primality test: an algorithm which determines whether a given number is prime or not.
The pseudocode, from Wikipedia is:
Input: n > 2, an odd integer to be tested for primality;
k, a parameter that determines the accuracy of the test
Output: composite if n is composite, otherwise probably prime
write n − 1 as 2^s·d with d odd by factoring powers of 2 from n − 1
LOOP: repeat k times:
pick a randomly in the range [2, n − 1]
x ← a^d mod n
if x = 1 or x = n − 1 then do next LOOP
for r = 1 .. s − 1
x ← x^2 mod n
if x = 1 then return composite
if x = n − 1 then do next LOOP
return composite
return probably primeFor more, check wikipedia.
In [22]:
import random # used for generation random bases
In [2]:
def miller_rabin(n, number_trials=13, use_random_bases=False, bases=[2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41],
fast_version=True):
if n < 2:
return False
# special case 2
if n == 2 or n == 3:
return True
# ensure n is odd
if n % 2 == 0:
return False
# write n-1 as 2**s * d
# repeatedly try to divide n-1 by 2
s, d = 0, n - 1
while True:
quotient, remainder = divmod(d, 2)
if remainder == 1:
break
s += 1
d = quotient
assert 2 ** s * d == n - 1
# test the base a to see whether it is a witness for the compositeness of n
def slow_witness(a):
if pow(a, d, n) == 1:
return False # possibly prime
for i in range(s):
if pow(a, 2 ** i * d, n) == n - 1:
return False # possibly prime
return True # composite
# test the base a to see whether it is a witness for the compositeness of n (but faster)
def fast_witness(a):
x = pow(a, d, n)
if x == 1 or x == n - 1:
return False # possibly prime
for _ in range(s - 1):
x = pow(x, 2, n)
if x == 1:
return True # composite
if x == n - 1:
return False # possibly prime
return True # composite
if fast_version:
witness = fast_witness
else:
witness = slow_witness
for i in range(number_trials):
if use_random_bases:
a = random.randrange(2, n)
else:
a = bases[i]
if a != n and witness(a): # do not use a is a == n
return False # definitely composite
return True # possibly prime
In [14]:
# naive implementation O(sqrt n) of a primality test
def naive_is_prime(n):
if n < 2:
return False
i = 2
while i * i <= n:
if n % i == 0:
return False # composite (i is a factor of n)
i += 1
return True # prime
In [34]:
# helper functions (basic choices of options)
def is_prime(n):
return miller_rabin(n)
def is_prime_slower(n):
return miller_rabin(n, fast_version=False)
def next_probable_prime(n):
n += 1
while not is_prime(n):
n += 1
return n
In [16]:
# basic usage
print(221, is_prime(221))
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# different behaviours for n=221
print(221, miller_rabin(221))
print(221, miller_rabin(221, number_trials=1, bases=[174]))
print(221, miller_rabin(221, use_random_bases=True))
In [31]:
import timeit
n = 89888786858483
print(n, is_prime(n), timeit.timeit("is_prime(n)", number=1, setup="from __main__ import is_prime, n"))
print(n, naive_is_prime(n), timeit.timeit("naive_is_prime(n)", number=1, setup="from __main__ import naive_is_prime, n"))
In [15]:
# test for correctness
is_prime(100) == naive_is_prime(100)
Out[15]:
In [25]:
# test for correctness (0 <= i <= 10^6)
N = 10 ** 6
[is_prime(i) for i in range(N)] == [naive_is_prime(i) for i in range(N)]
Out[25]:
In [13]:
# Miller-Rabin with slower witness function
%%time
xs = [is_prime_slower(i) for i in range(10 ** 6)]
In [12]:
# Miller-Rabin with faster witness function
%%time
xs = [is_prime(i) for i in range(10 ** 6)]
In [11]:
# Naive implementation of a primality test
%%time
xs = len([naive_is_prime(i) for i in range(10 ** 6)])
In [36]:
print(next_probable_prime(100))
print(next_probable_prime(2 ** 20))
print(next_probable_prime(2 ** 10))
print(next_probable_prime(13))