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I was always assuming that the following test will always succeed for finite values (no INF, no NAN) of somefloat:

assert(somefloat*0.0==0.0);

In Multiply by 0 optimization it was stated that double a=0.0 and double a=-0.0 are not strictly speaking the same thing.

So I was wondering whether this can lead to problems on some platforms e.g. can the result of the above test depend on a beeing positive or negative.

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Have you tested it? –  Konstantin D - Infragistics Dec 20 '12 at 12:33
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The C++ standard requires that +0.0 and -0.0 have the same behavior. The answer suggesting otherwise in the thread you quote is wrong, at least for C and C++. –  James Kanze Dec 20 '12 at 12:34
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This isn't a float operation, it is a double operation. –  Lundin Dec 20 '12 at 12:39
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@James: the standard says that positive and negative zeros compare equal, that's not the same thing as saying they have the same behavior in all circumstances. Isn't atan2 permitted (but not required) to return a value for atan2(ZERO,ZERO) that is distinct from the vale of atan2(NEGATIVE_ZERO,NEGATIVE_ZERO)? So the validity of that optimization in the other question isn't just a matter of whether the two possible results are equal. But I think what you wrote is correct, since IIRC in C and C++ the expression -0.0 doesn't evaluate to a negative zero. –  Steve Jessop Dec 20 '12 at 12:41
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@James: it's not UB, "it's a domain error" when both arguments are zero. A domain error means an implementation-defined value is returned (potentially). So for implementations that respect negative zeros and define that value to depend on the signs of the inputs, they can't just discard the sign of a zero willy-nilly in optimization because someone might later use it in atan2. The assert in this question is another matter, of course. –  Steve Jessop Dec 20 '12 at 20:05

3 Answers 3

up vote 9 down vote accepted

If your implementation uses IEEE 754 arithmetic (which most do), then positive and negative zero will compare equal. Since the left-hand side of your expression can only be either positive or negative zero for finite a, the assertion will always be true.

If it uses some other kind of arithmetic, then only the implementor, and hopefully the implementation-specific documentation, can tell you. Arguably (see comments) the wording of the standard can be taken to imply that they must compare equal in any case, and certainly no sane implementation would do otherwise.

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The documentation isn't implementation-specific; the C++ standard requires that positive and negative zero compare equal. (For that matter, I can't conceive of an implementation where they wouldn't compare equal. It would be unusable.) –  James Kanze Dec 20 '12 at 12:38
    
@James Do you have a reference from the standard? –  Andreas Brinck Dec 20 '12 at 12:41
    
@JamesKanze: I agree that it would be unusable otherwise, but I can't find where the standard requires it. Do you have a reference? –  Mike Seymour Dec 20 '12 at 12:43
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@MikeSeymour It's in the basic definition of the operators: "Each of the operators shall yield true if the specified relationship is true and false if it is false." Unless you're using a very special math, -0.0 is equal to 0.0, so -0.0 == 0.0 must return true. One could also deduce it from §5.2.4.2.2/1 in the C standard. But I agree that it could be clearer. –  James Kanze Dec 20 '12 at 12:59
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@Martin I think so, but you'd probably have to go to §5.2.4.2.2/1 in the C standard to prove it (which is included as part of the C++ standard in §18.2.2---not exactly where you'd go first to look for this sort of thing). –  James Kanze Dec 20 '12 at 13:01

-0.0 == 0.0 according to double comparison rules.

For non-finite values (+-Inf, Nan) somefloat*0.0 != 0.0.

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NaN as finite value is a bit weird. The OP asks about finite value. –  nhahtdh Dec 20 '12 at 12:35
    
Just refined it. NAN will not occur in my specific scenario –  Martin Dec 20 '12 at 12:37
    
What do you mean by "for non-finite values (+-Inf, Nan) somefloat*0.0 != 0.0." ? This looks a little confusing or is it just the formatting –  Martin Dec 20 '12 at 12:42
    
@Martin: I expect the intended meaning is “If somefloat is +infinity, -infinity, or a NaN, then somefloat*0. != 0. evaluates to true.” –  Eric Postpischil Dec 20 '12 at 14:52

Your assert can never fail, as long as somefloat is not infinity or NaN. On systems which don't support infinity or NaN, the compiler can simply optimize it out.

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