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When x is a double, is (x - x) guaranteed to be +0.0, or might it sometimes be -0.0 (depending on the sign of x)?

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tested: –  Absurd-Mind Jul 25 '14 at 8:15
@Absurd-Mind Great, now test all the other doubles! ;) –  jtbandes Jul 25 '14 at 8:19
Well @AbsurdMind answered your question - not always. Also I'm wondering, what is the case where you need to know that? –  ST3 Jul 28 '14 at 13:57
@ST3 Well I don't really care about NaN, so the answer is actually yes, always +0 if x is finite. It matters when used in atan2! –  jtbandes Jul 28 '14 at 16:08
You also have to take into account that another thread can possibly change the value of x. –  Jens Timmerman Jul 30 '14 at 7:29

2 Answers 2

up vote 58 down vote accepted

x - x can be +0.0 or NaN. There are no other values it can take in IEEE 754 arithmetics in round-to-nearest (and in Java, the rounding mode is always round-to-nearest). The subtraction of two identical finite values is defined as producing +0.0 in this rounding mode. Mark Dickinson, in comments below, cites the IEEE 754 standard as saying, section 6.3:

When the sum of two operands with opposite signs (or the difference of two operands with like signs) is exactly zero, the sign of that sum (or difference) shall be +0 in all rounding-direction attributes except roundTowardNegative [...].

This page shows that in particular 0.0 - 0.0 and -0.0 - (-0.0) are both +0.0.

Infinities and NaN both produce NaN when subtracted from themselves.

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Can you explain why round-to-nearest implies that +0.0 is the only possibility (when NaNs and Infs aren't involved)? And where is it documented that Java always uses round-to-nearest? –  jtbandes Jul 25 '14 at 8:09
@jtbandes It is not so much that round-to-nearest implies that +0.0 is the result, it is just that the result of both subtractions is defined this way in round-to-nearest (but is not defined this way for other rounding modes). Regarding the rounding mode, my source is –  Pascal Cuoq Jul 25 '14 at 8:13
@jtbandes: The sign of the zero is specified explicitly in the IEEE 754 standard, section 6.3: "When the sum of two operands with opposite signs (or the difference of two operands with like signs) is exactly zero, the sign of that sum (or difference) shall be +0 in all rounding-direction attributes except roundTowardNegative [...]" –  Mark Dickinson Jul 25 '14 at 8:22

The SMT solver Z3 supports IEEE floating point arithmetic. Let's ask Z3 to find a case where x - x != 0. It immediately finds NaN as well as +-infinity. Excluding those, there is no x that satisfies that equation.

(set-logic QF_FPA)    

(declare-const x (_ FP 11 53))
(declare-const r (_ FP 11 53))

(assert (and 
    (not (= x (as NaN (_ FP 11 53))))
    (not (= x (as plusInfinity (_ FP 11 53))))
    (not (= x (as minusInfinity (_ FP 11 53))))
    (= r (- roundTowardZero x x))
    (not (= r ((_ asFloat 11 53) roundTowardZero 0.0 0)))


Z3 implements IEEE floating point arithmetic by converting all operations to boolean circuits and using the standard SAT solver to find a model. Barring any bugs in that translation or the SAT solver the result is perfectly precise.

Proof for...

Note the counterexample for the rounding mode roundTowardNegative: For a certain x the result of x - x is negative zero. Such a case can hardly be found by humans. Yet, with an SMT solver it is easy to find. We can change = to == so that Z3 uses IEEE equality comparison semantics instead of exact equality. After that change, there is again no counter-example because -0 == +0 according to IEEE.

I tried making the rounding mode a variable. That would work in theory but Z3 has a bug here. For now we have to manually specify a hard-coded rounding mode. If we could make it a variable we could ask Z3 to prove this statement for all rounding modes in one query.

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Neat. But I'm getting Z3(15, 10): ERROR: model is not available –  jtbandes Jul 25 '14 at 19:17
@jtbandes a model would indicate a counter-example to our theory. Since no counter-example is available we have no model and the theory holds. I have edited out the get-model call. –  usr Jul 25 '14 at 19:21
Don't you want roundNearestTiesToEven instead of roundTowardZero? –  Mark Dickinson Jul 25 '14 at 19:31
Shouldn't one have to find a case where 1/(x-x) != 1/0.0? Otherwise, I think (-1 * 0.0) would compare equal to 0.0, would it not? –  supercat Jul 25 '14 at 23:42
@supercat = compares exactly, == according to the IEEE standard. Play with the two assertions and comment one of them in. –  usr Jul 26 '14 at 9:57

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