# Understanding Blum Blum Shub algorithm. (Python implementation)

``````class EmptySequenseError(Exception):
pass

class BlumBlumShub(object):
def __init__(self, length):
self.length = length
self.primes = e(1000)  # Primes obtained by my own Sieve of Eratosthenes implementation.

def get_primes(self):
out_primes = []
while len(out_primes) < 2:
curr_prime = self.primes.pop()
if curr_prime % 4 == 3:
out_primes.append(curr_prime)
return out_primes

def set_random_sequence(self):
p, q = self.get_primes()
m = p * q
self.random_sequence = [((x+1)**2)%m for x in range(self.length)]

def get_random_sequence(self):
if self.random_sequence:
return self.random_sequence
raise EmptySequenseError("Set random sequence before get it!")
``````

And I have several questions. At first I do not want to use `random` library, it is too naive. My sequence is increasing, it is not absolutely random. How to prevent increasing in returned sequence? And I do not understand this part of the algorithm description:

At each step of the algorithm, some output is derived from xn+1; the output is commonly either the bit parity of xn+1 or one or more of the least significant bits of xn+1.

Please explain to me what does it mean?

### Edit summary:

• The algorithm is corrected.
• Quote substituted to en.wikipedia quote.
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``````    for x in range(self.length):
self.random_sequence.append((x ** 2) % m)
``````

Just generates `[(x ** 2) % m for x in range(self.length)]`, which is roughly xn+1 = n2 mod M.

The algorithm is supposed to be: xn+1 = xn2 mod M

Do you see where your version is different?

As for the quote - you don't say where it's from, but Wikipedia has:

At each step of the algorithm, some output is derived from xn+1; the output is commonly either the bit parity of xn+1 or one or more of the least significant bits of xn+1.

It means that xn+1 is the seed for the next iteration, but not the pseudo-random number returned. Instead, the return value is derived from xn+1 by counting its bit parity (this yields either 0 or 1 each iteration), or by taking only some number of top bits.

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I still can't get, what should I return? Is parity bit means en.wikipedia.org/wiki/Parity_bit ? Should I return `((x+1)**2) % m` or something else? Or what the bitwise operation should be done? –  I159 Jun 14 '13 at 20:01
bit parity the even/odd quality of the number of 1's in the bit string. in python, that's basically: `parity_of_x = bin(x).count(1) % 2` –  SingleNegationElimination Jun 14 '13 at 20:56

Blum Blum Shub is described in Chapter Five of the Handbook of Applied Cryptography, Section 5.5.2. There is a lot of helpful stuff about random number generation in that chapter.

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Good book) Thanks –  I159 Jun 16 '13 at 15:11

I would rather formalize my understanding as answer.

``````class BlumBlumShub(object):
def __init__(self, length):
self.length = length
self.primes = e(1000)

def gen_primes(self):
out_primes = []
while len(out_primes) < 2:
curr_prime = self.primes[random.randrange(len(self.primes))]
if curr_prime % 4 == 3:
out_primes.append(curr_prime)
return out_primes

def random_generator(self):
x = random.randrange(1000000)
while self.length:
x += 1
p, q = self.gen_primes()
m = p * q
z = (x**2) % m
self.length -= 1
yield str(bin(z).count('1') % 2)

def get_random_bits(self):
return ''.join(self.random_generator())
``````
• BBS is pseudorandom bit generator, it must return random bits, not integers.
• Return value is just parity bit of result xn+12 % m operation.

If I wrong understood something, please explain my mistake.

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