rabin miller Algorithm
The Miller – Rabin primality test or Rabin – Miller primality test is a primality test: an algorithm which determines whether a given number is prime, like to the Fermat primality test and the Solovay – Strassen primality test. It was first observed by Russian mathematician M. M. Artjuhov in 1967.
# Primality Testing with the Rabin-Miller Algorithm
import random
def rabinMiller(num):
s = num - 1
t = 0
while s % 2 == 0:
s = s // 2
t += 1
for trials in range(5):
a = random.randrange(2, num - 1)
v = pow(a, s, num)
if v != 1:
i = 0
while v != (num - 1):
if i == t - 1:
return False
else:
i = i + 1
v = (v ** 2) % num
return True
def isPrime(num):
if num < 2:
return False
lowPrimes = [
2,
3,
5,
7,
11,
13,
17,
19,
23,
29,
31,
37,
41,
43,
47,
53,
59,
61,
67,
71,
73,
79,
83,
89,
97,
101,
103,
107,
109,
113,
127,
131,
137,
139,
149,
151,
157,
163,
167,
173,
179,
181,
191,
193,
197,
199,
211,
223,
227,
229,
233,
239,
241,
251,
257,
263,
269,
271,
277,
281,
283,
293,
307,
311,
313,
317,
331,
337,
347,
349,
353,
359,
367,
373,
379,
383,
389,
397,
401,
409,
419,
421,
431,
433,
439,
443,
449,
457,
461,
463,
467,
479,
487,
491,
499,
503,
509,
521,
523,
541,
547,
557,
563,
569,
571,
577,
587,
593,
599,
601,
607,
613,
617,
619,
631,
641,
643,
647,
653,
659,
661,
673,
677,
683,
691,
701,
709,
719,
727,
733,
739,
743,
751,
757,
761,
769,
773,
787,
797,
809,
811,
821,
823,
827,
829,
839,
853,
857,
859,
863,
877,
881,
883,
887,
907,
911,
919,
929,
937,
941,
947,
953,
967,
971,
977,
983,
991,
997,
]
if num in lowPrimes:
return True
for prime in lowPrimes:
if (num % prime) == 0:
return False
return rabinMiller(num)
def generateLargePrime(keysize=1024):
while True:
num = random.randrange(2 ** (keysize - 1), 2 ** (keysize))
if isPrime(num):
return num
if __name__ == "__main__":
num = generateLargePrime()
print(("Prime number:", num))
print(("isPrime:", isPrime(num)))
