Binary Addition without overflow wrap-around in C/C++

I know that when overflow occurs in C/C++, normal behavior is to wrap-around. For example, `INT_MAX+1` is an overflow.

Is possible to modify this behavior, so binary addition takes place as normal addition and there is no wraparound at the end of addition operation ?

Some Code so this would make sense. Basically, this is one bit (full) added, it adds bit by bit in 32

``````int adder(int x, int y)
{
int sum;
for (int i = 0; i < 31; i++)
{
sum = x ^ y;
int carry = x & y;
x = sum;
y = carry << 1;
}

return sum;
}
``````

If I try to `adder(INT_MAX, 1);` it actually overflows, even though, I amn't using `+` operator.

Thanks !

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Actually, overflowing a signed integer is undefined behaviour. –  Seth Carnegie Feb 28 '12 at 3:04
How do you do normal addition when the result won't fit? what should the result of `INT_MAX+1` be? –  Mark Ransom Feb 28 '12 at 3:04
@MarkRansom Normally one goes with "saturated" integers –  Mooing Duck Feb 28 '12 at 3:51
@MooingDuck that would have been my first guess too, but I don't want to guess. The phrasing "normal addition" has me confused. –  Mark Ransom Feb 28 '12 at 4:23
Of course it does, the high bit is falling off of the carry due to the left shift. Anyway, can you properly define what you want to happen in the case the result wouldn't fit in an int anymore? –  harold Feb 28 '12 at 8:10
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3 Answers

Overflow means that the result of an addition would exceed `std::numeric_limits<int>::max()` (back in C days, we used `INT_MAX`). Performing such an addition results in undefined behavior. The machine could crash and still comply with the C++ standard. Although you're more likely to get `INT_MIN` as a result, there's really no advantage to depending on any result at all.

The solution is to perform subtraction instead of addition, to prevent overflow and take a special case:

``````if ( number > std::numeric_limits< int >::max() - 1 ) { // ie number + 1 > max
// fix things so "normal" math happens, in this case saturation.
} else {
++ number;
}
``````

Without knowing the desired result, I can't be more specific about the it. The performance impact should be minimal, as a rarely-taken branch can usually be retired in parallel with subsequent instructions without delaying them.

Edit: To simply do math without worrying about overflow or handling it yourself, use a bignum library such as GMP. It's quite portable, and usually the best on any given platform. It has C and C++ interfaces. Do not write your own assembly. The result would be unportable, suboptimal, and the interface would be your responsibility!

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+1 for being the only correct answer –  Seth Carnegie Feb 29 '12 at 1:00
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No, you have to add them manually to check for overflow.

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What does manual addition entail? Pencil and paper? –  Potatoswatter Feb 28 '12 at 3:21
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What do you want the result of `INT_MAX + 1` to be? You can only fit `INT_MAX` into an `int`, so if you add one to it, the result is not going to be one greater. (Edit: On common platforms such as x86 it is going to wrap to the largest negative number: `-(INT_MAX+1)`. The only way to get bigger numbers is to use a larger variable.

Assuming `int` is 4-bytes (as is typical on x86 compilers) and you are executing an `add` instruction (in 32-bit mode), the destination register simply does overflow -- it is out of bits and can't hold a larger value. It is a limitation of the hardware.

To get around this, you can hand-code, or use an aribitrarily-sized integer library that does the following:

• First perform a normal `add` instruction on the lowest-order words. If overflow occurs, the Carry flag is set.
• For each increasingly-higher-order word, use the `adc` instruction, which adds the two operands as usual, but takes into account the value of the Carry flag (as a value of 1.)

You can see this for a 64-bit value here.

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With 2's complement arithmetic it won't wrap to zero, it will wrap to `-(INT_MAX+1)`. And of course it can be compiler dependent although I'm not aware of one that won't let the underlying processor architecture make the determination. –  Mark Ransom Feb 28 '12 at 3:20
try "if you add one to it, the result is not going to be one greater" –  Potatoswatter Feb 28 '12 at 3:22
The question is for C++, not x86-64 assembly. Wraparound is not guaranteed and there is no carry flag. –  Potatoswatter Feb 28 '12 at 3:33
The machine could do anything; it's undefined behavior. Some machines implement saturation or integral overflow exceptions. You could get a wraparound to `-INT_MAX` on a one's complement machine, or any other bizarre result. –  Potatoswatter Feb 28 '12 at 3:44
@Jonathon: -1. Undefined behaviour is undefined. You can't possibly rely on anything, by definition. See this question stackoverflow.com/questions/7682477/… for an example of "usually X happens, but sometimes everything gets frakked up beyond all repair". –  R. Martinho Fernandes Feb 29 '12 at 1:00
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