# Math problems in Java; uncanny NaN from a calculation

I am working on a project that does a lot of querying and the some mathematical modeling based on results from these queries, and finally some scoring (read: "execution time too long to test thoroughly").

Recently I have realized a rather new problem/bug in my code; some of the results get `NaN` values for score! Here's how the scores are calculated:

Note that `pfound`, `psig` are `double`s that are always positive or 0

``````Double  score1 = (pfound!=0) ? (Math.log(factorial((int)psig + 1))/pfound) : 0;

score1 = score1 * alpha_coeff[0];
if (score1.isInfinite())
throw new RuntimeException(p.getName() + " score1 = Inf");
else if(score1.isNaN())
throw new RuntimeException(p.getName() + " score1 = NaN");
``````

I have checked the possible causes triggering `NaN`, but I believe it should be safe from most of those:

1. I am already checking for pfound == 0 (so no divide by zero)

2. Argument to Math.log() cannot have a negative value

What I suspect is whether or not `factorial()` (a custom function which return the factorial as a `long`) returns a `long` so big that it can't be cast into a `double` without loss of precision or something like that. I checked `Long.doubleValue()`, and apparently it generates `NaN` if it's argument results in `NaN`.

Any comments? Am I missing something fundamental here?

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Don't worry about casting the long to a double - this is always safe in the sense that it won't produce NaN, although you might lose some low order precision. –  mikera Jul 6 '10 at 15:49

NaNs propagate through various arithmetic operations so even if you are checking the conditions here correctly they could be getting introduced from elsewhere.

I'd suspect either alpha_coeff[0] or pfound - try checking these for NaN.

NaN could also be a result from your factorial function, depending on how this is defined. EDIT: just noticed that you specified that this produces a long, so factorial can't produce a NaN, on the other hand it could produce a negative result if it overflows which would cause a NaN from the log().

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p.s. note that 0 != NaN, so if pfound is NaN then the first half of your condition gets executed. This will then produce NaN as the overall result. –  mikera Jul 6 '10 at 15:44
alpha_coeff.s are all positive doubles between 0-1.. so thats safe too.. as for the factorial(), i think you might be onto something, I checked a bit more and it appears that the largest value they can hold is 2^63-1 which translates to something like E18. Gotta check if my factorial goes above that.. ps: does anyone know how to typeset the comments so that gray background shows for the code related stuff like NaN –  posdef Jul 6 '10 at 15:49
If factorial is overflowing you could get a negative value, which would result in NaN from the log() function..... –  mikera Jul 6 '10 at 15:54
OK, it turns out that the value factorial should return is around E32 which is clearly over the max value for Long. If I use `BigInteger` instead for my factorial function, can I send it to `Math.log()` just like a long? –  posdef Jul 6 '10 at 15:59
Yep, you should be able to use BigInteger, you'll probably need to apply BigInteger.doubleValue() at some point to convert to double before doing the log. –  mikera Jul 6 '10 at 16:19

If your factorial is doing the naive evaluation of x! = 1*2*3..., I'll bet you're asking for a factorial of a number that can't fit into the reference you're using.

1. Try BigDecimal if that's the case
2. Use gamma function instead of naive implementation.

Recursion for factorial(n) where n > 12 is a very bad, naive idea. You weren't seriously thinking about going forward with something like this, were you?

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yes it is a very simple recursive function, and yes again, it does most likely cause an overflow as mentioned in my comment to @mikera's post above. It's very interesting that you mention the gamma function, I have not thought of that before :) Could you possibly comment on the performance of an implementation of that instead of the recursive factorial method. Oh, and lastly, I guess regardless what I use, I still need `BigInteger`, right? –  posdef Jul 7 '10 at 7:41
No, BigDecimal. The gamma function is more general than the naive factorial. Gamma's different because it's not recursive: you pass it an argument and the value comes back. There's a nice implementation in "Numerical Recipes". You can also check out Abramowitz and Stegun. Or this: luschny.de/math/factorial/FastFactorialFunctions.htm –  duffymo Jul 7 '10 at 10:41
A factorial should be a lookup table, not computed at run-time. –  Hamish Grubijan Jul 7 '10 at 12:04
hmm, thanks for the links. turns out an implementation of `logGamma()` is implemented readily in Apache Commons Math package which I have already implemented. Then n! = `Math.exp(logGamma(n+1))` should solve my problems? –  posdef Jul 7 '10 at 12:05
i just realized that I dont need the exp function at all, thanks a lot for the help on the factorial! –  posdef Jul 7 '10 at 12:22

You shouldn't compare doubles against zero explicitly - it almost never works. Better do something like this:

``````double EPS = 0.0000001;
if (Math.abs (pfound) < EPS) { //pfound is null }
``````

The only place I see which can produce NaN is `Math.log`. From its documentation:

1. If the argument is NaN or less than zero, then the result is NaN.
2. If the argument is positive infinity, then the result is positive infinity.
3. If the argument is positive zero or negative zero, then the result is negative infinity.

I think `pfound` contains negative value neer zero and that's why you get NaN. Try to track variable values in a debugger.

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Further to the above, if they (pFound, psig) are always positive or zero, why are you using a Double? –  freespace Jul 6 '10 at 15:34
great call with pfound, and psig, i see no reason why they should be double, must have lost track of things there.. they are now int.s anyhow.. –  posdef Jul 6 '10 at 15:45
when dealing with Java, it's usually best not to think (or suggest) that "null" and "0" are the same thing. A double cannot be assigned a value of null, but it can be assigned a value of 0. –  Mark Peters Jul 6 '10 at 15:58
It feels almost like a MATLAB trick... –  posdef Jul 6 '10 at 16:02