I was reading about order of evaluation violations, and they give an example that puzzles me.
1) If a side effect on a scalar object is un-sequenced relative to another side effect on the same scalar object, the behavior is undefined.
// snip f(i = -1, i = -1); // undefined behavior
In this context,
i is a scalar object, which apparently means
Arithmetic types (3.9.1), enumeration types, pointer types, pointer to member types (3.9.2), std::nullptr_t, and cv-qualified versions of these types (3.9.3) are collectively called scalar types.
I don’t see how the statement is ambiguous in that case. It seems to me that regardless of if the first or second argument is evaluated first,
i ends up as
-1, and both arguments are also
Can someone please clarify?
I really appreciate all the discussion. So far, I like @harmic’s answer a lot since it exposes the pitfalls and intricacies of defining this statement in spite of how straight forward it looks at first glance. @acheong87 points out some issues that come up when using references, but I think that's orthogonal to the unsequenced side effects aspect of this question.
Since this question got a ton of attention, I will summarize the main points/answers. First, allow me a small digression to point out that "why" can have closely related yet subtly different meanings, namely "for what cause", "for what reason", and "for what purpose". I will group the answers by which of those meanings of "why" they addressed.
for what cause
It is undefined behavior because it is not defined what the behavior is.
The answer is overall very good in terms of explaining what the C++ standard says. It also addresses some related cases of UB such as
f(++i, ++i); and
f(i=1, i=-1);. In the first of the related cases, it's not clear if the first argument should be
i+1 and the second
i+2 or vice versa; in the second, it's not clear if
i should be 1 or -1 after the function call. Both of these cases are UB because they fall under the following rule:
If a side effect on a scalar object is unsequenced relative to another side effect on the same scalar object, the behavior is undefined.
f(i=-1, i=-1) is also UB since it falls under the same rule, despite that the intention of the programmer is (IMHO) obvious and unambiguous.
Paul Draper also makes it explicit in his conclusion that
Could it have been defined behavior? Yes. Was it defined? No.
which brings us to the question of "for what reason/purpose was
f(i=-1, i=-1) left as undefined behavior?"
for what reason / purpose
Although there are some oversights (maybe careless) in the C++ standard, many omissions are well-reasoned and serve a specific purpose. Although I am aware that the purpose is often either "make the compiler-writer's job easier", or "faster code", I was mainly interested to know if there is a good reason leave
f(i=-1, i=-1) as UB.
harmic and supercat provide the main answers that provide a reason for the UB. Harmic points out that an optimizing compiler that might break up the ostensibly atomic assignment operations into multiple machine instructions, and that it might further interleave those instructions for optimal speed. This could lead to some very surprising results:
i ends up as -2 in his scenario! Thus, harmic demonstrates how assigning the same value to a variable more than once can have ill effects if the operations are unsequenced.
supercat provides a related exposition of the pitfalls of trying to get
f(i=-1, i=-1) to do what it looks like it ought to do. He points out that on some architectures, there are hard restrictions against multiple simultaneous writes to the same memory address. A compiler could have a hard time catching this if we were dealing with something less trivial than
davidf also provides an example of interleaving instructions very similar to harmic's.
Although each of harmic's, supercat's and davidf' examples are somewhat contrived, taken together they still serve to provide a tangible reason why
f(i=-1, i=-1) should be undefined behavior.
I accepted harmic's answer because it did the best job of addressing all meanings of why, even though Paul Draper's answer addressed the "for what cause" portion better.
JohnB points out that if we consider overloaded assignment operators (instead of just plain scalars), then we can run into trouble as well.