mirror of
https://github.com/Sneed-Group/Poodletooth-iLand
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138 lines
5.2 KiB
Python
138 lines
5.2 KiB
Python
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"""RandomNumGen module: contains the RandomNumGen class"""
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__all__ = ['randHash', 'RandomNumGen']
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from direct.directnotify import DirectNotifyGlobal
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from pandac.PandaModules import Mersenne
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def randHash(num):
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""" this returns a random 16-bit integer, given a seed integer.
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It will always return the same output given the same input.
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This is useful for repeatably mapping numbers with predictable
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bit patterns (i.e. doIds or zoneIds) to numbers with random bit patterns
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"""
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rng = RandomNumGen(num)
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return rng.randint(0, (1<<16) - 1)
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class RandomNumGen:
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notify = \
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DirectNotifyGlobal.directNotify.newCategory("RandomNumGen")
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def __init__(self, seed):
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"""seed must be an integer or another RandomNumGen"""
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if isinstance(seed, RandomNumGen):
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# seed this rng with the other rng
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rng = seed
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seed = rng.randint(0, 1L << 16)
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self.notify.debug("seed: " + str(seed))
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seed = int(seed)
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rng = Mersenne(seed)
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self.__rng = rng
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def __rand(self, N):
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"""returns integer in [0..N)"""
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"""
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# using modulus biases the numbers a little bit
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# the bias is worse for larger values of N
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return self.__rng.getUint31() % N
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"""
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# this technique produces an even distribution.
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# random.py would solve this problem like so:
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# where:
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# M=randomly generated number
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# O=1 greater than the maximum value of M
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# return int(float(M)*(float(N)/float(O))) # M*(N/O)
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#
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# that generally works fine, except that it relies
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# on floating-point numbers, which are not guaranteed
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# to produce identical results on different machines.
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#
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# for our purposes, we need an entirely-integer approach,
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# since integer operations *are* guaranteed to produce
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# identical results on different machines.
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#
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# SO, we take the equation M*(N/O) and change the order of
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# operations to (M*N)/O.
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#
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# this requires that we have the ability to hold the result of
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# M*N. Luckily, Python has support for large integers. One
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# alternative would be to limit the RNG to a 16-bit range,
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# in which case we could do this math down in C++; but 16 bits
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# really doesn't provide a large enough range (0..65535).
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# Finally, since our O happens to be a power of two (0x80000000),
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# we can replace the divide with a shift.
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# boo-ya
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# the maximum for N ought to be 0x80000000, but Python treats
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# that as a negative number.
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assert N >= 0
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assert N <= 0x7fffffff
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# the cast to 'long' prevents python from importing warnings.py,
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# presumably to warn that the multiplication result is too
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# large for an int and is implicitly being returned as a long.
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# import of warnings.py was taking a few seconds
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return int((self.__rng.getUint31() * long(N)) >> 31)
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def choice(self, seq):
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"""returns a random element from seq"""
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return seq[self.__rand(len(seq))]
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def shuffle(self, x):
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"""randomly shuffles x in-place"""
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for i in xrange(len(x)-1, 0, -1):
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# pick an element in x[:i+1] with which to exchange x[i]
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j = int(self.__rand(i+1))
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x[i], x[j] = x[j], x[i]
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def randrange(self, start, stop=None, step=1):
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"""randrange([start,] stop[, step])
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same as choice(range(start, stop[, step])) without construction
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of a list"""
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## this was lifted from Python2.2's random.py
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# This code is a bit messy to make it fast for the
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# common case while still doing adequate error checking
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istart = int(start)
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if istart != start:
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raise ValueError, "non-integer arg 1 for randrange()"
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if stop is None:
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if istart > 0:
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return self.__rand(istart)
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raise ValueError, "empty range for randrange()"
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istop = int(stop)
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if istop != stop:
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raise ValueError, "non-integer stop for randrange()"
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if step == 1:
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if istart < istop:
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return istart + self.__rand(istop - istart)
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raise ValueError, "empty range for randrange()"
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istep = int(step)
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if istep != step:
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raise ValueError, "non-integer step for randrange()"
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if istep > 0:
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n = (istop - istart + istep - 1) / istep
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elif istep < 0:
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n = (istop - istart + istep + 1) / istep
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else:
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raise ValueError, "zero step for randrange()"
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if n <= 0:
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raise ValueError, "empty range for randrange()"
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return istart + istep*int(self.__rand(n))
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def randint(self, a, b):
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"""returns integer in [a, b]"""
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assert a <= b
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range = b-a+1
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r = self.__rand(range)
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return a+r
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# since floats are involved, I would recommend not trusting
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# this function for important decision points where remote
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# synchronicity is critical
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def random(self):
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"""returns random float in [0.0, 1.0)"""
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return float(self.__rng.getUint31()) / float(1L << 31)
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