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How do you prove that one RNG is better than another?

I don't mean in terms of runtime, but rather the amount of entropy "generated" - which also rolls in the notion of periodicity (low period = low entropy).

Can a RNG be provable optimal? Or is this an unobtainable goal? By optimal, I mean any sequence is equally likely and independent of past or future results.

I'm interested in algorithms, not cosmic background sampling devices or other sources of physical "randomness" (is it random or just complex?)

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I'm pretty sure there's no way to prove "optimal" randomness. –  Gabe Dec 29 '10 at 18:06
NIST provides documentation and software for testing randomness of RNGs: csrc.nist.gov/groups/ST/toolkit/rng/index.html .. The document is here, and describes 15 different RNG tests: csrc.nist.gov/groups/ST/toolkit/rng/documents/SP800-22rev1a.pdf –  indiv Dec 29 '10 at 18:10
Don't think in terms of optimality, think in terms of suitability for a purpose. What purpose are you putting the RNG to? What are your constraints? This will determine which algorithm to use. –  Alex Feinman Dec 29 '10 at 19:17

6 Answers 6

up vote 4 down vote accepted

The old standard for testing used to be the "Diehard tests." http://en.wikipedia.org/wiki/Diehard_tests This has been superceded by the NIST tests that DKnight pointed out: http://csrc.nist.gov/groups/ST/toolkit/rng/index.html. The Diehard wiki article gives you a good overview of the kind of things that are looked at. The NIST bit will take a bit more digging.

As you state it, no pseudo RNG (algorithm) can be proven optimal. They all have a seed value and are dependent on the input to generate a value. If you know the seed and the state, you know the next value. As an example, check out http://en.wikipedia.org/wiki/Mersenne_twister. I like it mostly because of the awesome name, but the article does a good job explaining the tenets of a PRNG.

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See http://www.random.org/analysis/

The one and only optimal RNG:

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Generate sequences of numbers and then try to compress them. The more random ones will compress less. Pure randomness is incompressible. It would be interesting to see the results, and if there are going to be differences.

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It would depend a lot on the compression algorithm. I suspect that most compression algorithms are not "smart" enough to compress even bad random number sequences. On the other hand, it is easy to compress many completely random sequences. The digits in pi are thought to be random, yet it is trivial to "compress" this sequence. –  pafcu Dec 29 '10 at 18:10
See @marcog's answer. Who is to say that in 1,000,000 runs getting 1,000,000 4's is any less random then any other result. Less likely results do not mean less random –  asawyer Dec 29 '10 at 18:30
@asawyer True. But I guess any randomness test will give you a bad result when presented to 10^6 equal numbers ... :D –  belisarius Dec 29 '10 at 20:27
@pafcu: a PRNG which outputs the digits of pi is not a good random number generator, so I think the example is irrelevant. A compression algorithm that compressed it would correctly identify the data as "bad". @asawyer: specifically, if your PRNG gives you a million 4s (or any other specific sequence that you guessed in advance) you say that the generator is bad with extremely high confidence. If that level of confidence isn't good enough for you, don't take prescription medication, or expect gravity to work. –  Steve Jessop Dec 30 '10 at 0:07
@Steve Jessop: Books containing digits of pi have been sold specifically as a source for random numbers. Can you tell me why pi is a bad generator? Just because it has only one possible sequence does not make that sequence any less random. As a bonus it has an infinite period. –  pafcu Dec 30 '10 at 5:37

The National Institute of Standards and Technology has some good info on this:


Looks like there is a test suite and lots of good reference material

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There is an objective definition from computational complexity theory: the asymptotic time complexity required to distinguish the output from random data.

A good PRNG should force a distinguisher to spend lots more time as the size of the seed increases or as the level of certainty required increases. (With fixed size seeds I suppose you'd look at the actual running time as well as the program complexity.)

  • For comparing one PRNG against another, the one with a smaller/faster distinguisher is worse.
  • One common assumption, even though it's not been proven, is that some PRNGs are indistinguishable from random in polynomial time. That's one possible meaning for 'optimal'.
  • Statistical tests, like the diehard tests, are just simple distinguishers.
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The basics are in Knuth, The Art of Computer Programming Vol 2, "Seminumerical algorithms". The idea is to devise tests of randomness where each test will try to find non-random aspects of a PRNG. Note that what might seem to be random to a human being is not. For instance, we tend to say that the sequence '1,4,4,1' for instance is non-random, whereas it may occur perfectly on a larger random sequence.

So the approach is roughly:

  • Find different tests for randomness, this is essentially DieHard and NIST test groups.
  • Execute said tests on the PRNG.
  • If the PRNG fails one or more of the tests it can be perceived as a weaker PRNG than ones that survives.

A cool example of a test is phase-space analysis. Here is a link of it executed some years back on TCP randomness generators for different operating systems:


Other classical tests are chi-squares, Komolgorov-Smirnoff etc, all explained in Knuth. Good PRNGs survive any conceivable attack on them.

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