# Correct way to take absolute value of INT_MIN

I want to perform some arithmetic in unsigned, and need to take absolute value of negative int, something like

``````do_some_arithmetic_in_unsigned_mode(int some_signed_value)
{
unsigned int magnitude;
int negative;
if(some_signed_value<0) {
magnitude = 0 - some_signed_value;
negative = 1;
} else {
magnitude = some_signed_value;
negative = 0;
}
...snip...
}
``````

But INT_MIN might be problematic, 0 - INT_MIN is UB if performed in signed arithmetic. What is a standard/robust/safe/efficient way to do this in C?

EDIT:

If we know we are in 2-complement, maybe implicit cast and explicit bit ops would be standard? if possible, I'd like to avoid this assumption.

``````do_some_arithmetic_in_unsigned_mode(int some_signed_value)
{
unsigned int magnitude=some_signed_value;
int negative=some_signed_value<0;
if (negative) {
magnitude = (~magnitude) + 1;
}
...snip...
}
``````
-

Conversion from signed to unsigned is well-defined: You get the corresponding representative modulo 2N. Therefore, the following will give you the correct absolute value of `n`:

``````int n = /* ... */;

unsigned int abs_n = n < 0 ? UINT_MAX - ((unsigned int)(n)) + 1U
: (unsigned int)(n);
``````

Update: As @aka.nice suggests, we can actually replace `UINT_MAX + 1U` by `0U`:

``````unsigned int abs_n = n < 0 : -((unsigned int)(n)) : (unsigned int)(n);
``````
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Oh, and in the purely theoretical case where `UINT_MAX == INT_MAX == -(INT_MIN+1)`, it is impossible to represent `|INT_MIN|` as an `unsigned int` anyway =) –  Daniel Fischer Sep 1 '12 at 21:42
@DanielFischer: is that case actually possible, given that `int` and `unsigned int` are required to have the same size and alignment requirements? –  Kerrek SB Sep 1 '12 at 22:03
It is possible, `unsigned int` could have one more padding bit than `int`. I've never heard of an implementation where that's the case, but the standard doesn't guarantee that it never happens. (Unless I've overlooked something.) –  Daniel Fischer Sep 1 '12 at 22:06
If I write abs_n = n<0 ? 0U - ((unsigned int)(n)) : ((unsigned int)(n)); is it equally well defined? –  aka.nice Sep 2 '12 at 10:15
Actually, my proposed test is wrong. It accounts for 2's complement implementations, but not 1s' complement or sign-magnitude, where `(unsigned)INT_MIN != 0` would be true even if the absolute value didn't fit. The "Fischer condition" is necessary and sufficient if you want your function to return `unsigned int`, but a correct test for it isn't quite that simple... –  Steve Jessop Sep 3 '12 at 9:53

In the negative case, take `some_signed_value+1`. Negate it (this is safe because it can't be `INT_MIN`). Convert to unsigned. Then add one;

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I checked and gcc generate same code for 1U+(unsigned)(-(x+1)) and for -(unsigned)(x), something like (~magnitude)+1 but branchless, so both will be as efficient. Later one seems a bit less intention obscuring though. –  aka.nice Sep 2 '12 at 19:34
@aka.nice: Yes, I just checked it too. `1+(unsigned)-(x+1)` is perhaps a bit obscure, but it does not bring in the value conversion of a negative signed quantity to unsigned; the cast is purely a change in type, not a change in value. In your version, some reasoning effort needs to go into assuring that the arithmetic does what's expected; the argument is not as simple as "the values are in a safe range at each step". –  R.. Sep 2 '12 at 19:39
Yes, indeed your solution better fit my initial intention. Re-interpreting the negative x as a positive is intention obscuring for one closely reading the code, and require knowledge of standard conventions. But less attentive reader will immediately recognize a form of abs in -(unsigned)x... –  aka.nice Sep 3 '12 at 18:08

You can always test for `>= -INT_MAX`, this is always well defined. The only case is interesting for you is if `INT_MIN < -INT_MAX` and that `some_signed_value == INT_MIN`. You'd have to test that case separately.

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