x is a
(x - x) guaranteed to be
+0.0, or might it sometimes be
-0.0 (depending on the sign of
This page shows that in particular
Infinities and NaN both produce NaN when subtracted from themselves.
The SMT solver Z3 supports IEEE floating point arithmetic. Let's ask Z3 to find a case where
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.
Note the counterexample for the rounding mode
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.