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I am curious on how someone would go about determining the state of a Linear Congruential Generator given its output.

    X(n-1) = (aX(n) + c) mod p

Since the values returned are deterministic and the formula is well known, it should be possible to obtain state's value. What exactly is the best way to do this?


I was at work when I posted this and this isn't work related, so I didn't spend much time and should have elaborated (much) further.

Assume this is used to generate non-integer values between 0 and 1, but its only visible output is true or false with a 50/50 spread. Assume the implementation is also known, so the values of a, c and p are known, but not X.

Would it be possible, with an finite amount of output, to determine the value of X?

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Are you asking programmatically, or mathematically? –  shoover Dec 20 '13 at 18:47
I would like to know both –  Martin Dec 20 '13 at 18:48
You might get more responses on the math SE, but you could start with this old discussion in sci.math. –  shoover Dec 21 '13 at 2:33

1 Answer 1

Well, in the simplest case, the output IS the state -- the output is the sequence X0, X1, X2, ... each element of which is the internal state at one step.

More commonly, the LCRNG will be divided to generate uniform numbers in the range [0,k) rather than [0,p) (the values output will be floor(kXn/p),) so will only tell you the upper bits of the internal state. In this case, each output value will give you a range of possible value for the state at that step. By correlating multiple consecutive values, you can narrow down the range.

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