I would like to compile a program with gfortran and -O3 -ffast-math enabled, since it gives a nice performance boost. I was rather confused, that gfortran's isnan() catched some NaN's but not all of them. After reading

Checking if a double (or float) is NaN in C++
how do I make a portable isnan/isinf function
Negative NaN is not a NaN?

I am under the impression that people are able to check for NaN's in C via bit-fiddling even with fast-math enabled. However, this puzzles me since fast-math

can result in incorrect output for programs that depend on an exact implementation of IEEE or ISO rules/specifications for math functions.

According to the man page of gcc 4.7.2. So how do you know which bit to check, if the numbers are not represented according to IEEE standard? And if you know it, how would you implement it in Fortran 95/03/08?

Don't bother to post (x \= x) or simlar solutions which depend on IEEE rules. They give the same result as isnan(). I am also aware of -ffpe-trap=invalid,zero,overflow, but don't want to stop the program. If it helps, my OS is 64-bit LinuxMint 14. If it is not possible in Fortran, a waterproof C solution would also be nice.

  • 1
    In compilers that support You can force the compiler to adhere to IEEE rules by using the appropriate intrinsic module. However, gfortran does not support that. You have to live with the fact that fast-math can be unsafe in this regard. – Vladimir F Apr 11 '13 at 11:18
  • 1
    When you turn on fast-math, you are promising the compiler that it can freely pretend that NaNs do not exist. This means that computations that would ordinarily produce NaN may not, and that the compiler can optimize away any code that checks for NaNs (since you promised that they don’t exist!), which makes isnan essentially useless. Your question is the equivalent of speeding on a curvy mountain road at night wearing a blindfold, and worrying about your busted tail light. – Stephen Canon Apr 18 '13 at 15:57

First I would point out that gfortran 4.9 supports the IEEE_arithmetic module. However, I cannot depend on gfortran 4.9, it is too fresh.

What I actually use in practice is to move the check x/=x to a procedure which is compiled without -ffast-math and without link time optimizations:

module ieee_arithmetic
  !poor man's replacement for the intrinsic module
  !do not use if the compiler supports the F2003 version
  !make sure not to use fast math optimizations
  use iso_fortran_env

  !common extension isnan may actually fail with optimizations above
!   intrinsic isnan

  interface ieee_is_nan
    module procedure ieee_is_nan_real32
    module procedure ieee_is_nan_real64
  end interface

  logical function ieee_is_nan_real32(x) result(res)
    real(real32), intent(in) :: x

    res = x /= x
  end function

  logical elemental function ieee_is_nan_real64(x) result(res)
    real(real64), intent(in) :: x

    res = x /= x
  end function

end module

It is in a separate file, which is then compiled without -Ofast, --ffast-math and without -flto. Beware the lack of inlining can case serious performance decrease.

  • Mh have you checked that it actually always works with numbers that come out of modules that are compiled with -ffast-math? If so could you explain why? I thought the important information is in the number itself not in the checking routine. – bijancn Nov 27 '14 at 11:09
  • @bijancn No, the point is in the checking routine. The -ffast-math simply optimizes the check to false. It is very simple. – Vladimir F Nov 27 '14 at 11:48
  • I see. +1 for you! – bijancn Nov 27 '14 at 14:03

I was facing the same problem in gfortran-4.7 and started to experiment with some expressions. For my Test Cases this one returned true if x is a NaN:

check = ((x*2d0==x).AND.(

I've checked only double precision values and -O2 -ffast-math, -O3 -ffast-math options. Note that this returns .false. if using no optimization flags, thus you would have to combine it with

isnan(x) .OR. check
  • That is an interesting hack but not really a solution if you want to support multiple compilers and versions and precision types :). – bijancn Nov 27 '14 at 11:11

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