# performance of unsigned vs signed integers

Is there any performance gain/loss by using unsigned integers over signed integers?

If so, does this goes for short and long as well?

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Not enough that you need to care about it. –  JeremyP Jan 17 '11 at 11:34
@JeremyP, might I suggest that you spoke the truth only for the majority of developers and applications.... –  Brett Nov 11 '12 at 21:31
@Brett: The difference between signed and unsigned arithmetic on most CPUs is zero. The difference for various sizes is marginal unless you are doing a lot of arithmetic. –  JeremyP Nov 12 '12 at 8:03

Division by powers of 2 is faster with `unsigned int`, because it can be optimized into a single shift instruction. With `signed int`, it usually requires more machine instructions, because division rounds towards zero, but shifting to the right rounds down. Example:

``````int foo(int x, unsigned y)
{
x /= 8;
y /= 8;
return x + y;
}
``````

Here is the relevant `x` part (signed division):

``````movl 8(%ebp), %eax
leal 7(%eax), %edx
testl %eax, %eax
cmovs %edx, %eax
sarl \$3, %eax
``````

And here is the relevant `y` part (unsigned division):

``````movl 12(%ebp), %edx
shrl \$3, %edx
``````
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This will only work in case when the divisor is a complile-time known constant being a power of two, won't it? –  sharptooth Jan 17 '11 at 11:31
@sharptooth, for division, yes. There are probably other bit manipulations tricks which are valid only for unsigned. Or signed. I don't think the positive effect is only in one direction. –  AProgrammer Jan 17 '11 at 12:06
Why the trick can't be done for non-constant divisors? The first operand of x86 `shrl` should be a literal? –  Manu343726 Dec 30 '13 at 11:57
@Manu343726 What if the divisor is not a power of 2? (And even if it was, you would first have to calculate the binary logarithm of the number before shifting.) –  fredoverflow Oct 4 '14 at 16:08

In C++ (and C), signed integer overflow is undefined, whereas unsigned integer overflow is defined to wrap around. Notice that e.g. in gcc, you can use the -fwrapv flag to make signed overflow defined (to wrap around).

Undefined signed integer overflow allows the compiler to assume that overflows don't happen, which may introduce optimization opportunities. See e.g. this blog post for discussion.

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This will depend on exact implementation. In most cases there will be no difference however. If you really care you have to try all the variants you consider and measure performance.

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`+1` for "if you want to know, you need to measure". It's very annoying that this needs the be answered almost weekly. –  sbi Jan 17 '11 at 10:55

This is pretty much dependent on the specific processor.

On most processors, there are instructions for both signed and unsigned arithmetic, so the difference between using signed and unsigned integers comes down to which one the compiler uses.

If any of the two is faster, it's completely processor specific, and most likely the difference is miniscule, if it exists at all.

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`unsigned` leads to the same or better performance than `signed`. Some examples:

• Division by a constant which is a power of 2 (see also the answer from FredOverflow)
• Division by a constant number (for example, my compiler implements division by 13 using 2 asm instructions for unsigned, and 6 instructions for signed)
• Checking whether a number is even (i have no idea why my MS Visual Studio compiler implements it with 4 instructions for `signed` numbers; gcc does it with 1 instruction, just like in the `unsigned` case)

`short` usually leads to the same or worse performance than `int` (assuming `sizeof(short) < sizeof(int)`). Performance degradation happens when you assign a result of an arithmetic operation (which is usually `int`, never `short`) to a variable of type `short`, which is stored in the processor's register (which is also of type `int`). All the conversions from `short` to `int` take time and are annoying.

Note: some DSPs have fast multiplication instructions for the `signed short` type; in this specific case `short` is faster than `int`.

As for the difference between `int` and `long`, i can only guess (i am not familiar with 64-bit architectures). Of course, if `int` and `long` have the same size (on 32-bit platforms), their performance is also the same.

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I would be careful with the statement about the performance of short compared to int. While arithmetic "might" be faster using int , one should remember that integer arithmetic is rarely a bottleneck (on modern desktop cpus at least), memory bandwidth on the other hand often is, so for large datasets short might actually give considerably better performance then int. Furthermore, for autovectorized code using smaller datatypes often means that more data elements can be prcoessed at one, so even arithmetic performance might increase (though unlikely given the current state of autovectorizers). –  Grizzly Jan 18 '11 at 21:26
@Grizzly I agree (my app is actually computation-heavy, so my experience with `short` is different than yours/anyone else's) –  anatolyg Jan 19 '11 at 16:59
@Grizzly Does this also mean that with short, CPU cache can be used more optimally because it will be able to hold more data? –  martinkunev Jun 30 '14 at 13:38
@martinkunev Absolutely! This may be the only reason to use `short` today (with non-cache RAM being effectively infinite), and a very good reason. –  anatolyg Jun 30 '14 at 18:55
@anatolyg RAM may be effectively infinite, but don't forget that 32-bit programs still outnumber 64-bit ones by a large margin, which means regardless of how much RAM is available, you're still often limited to 2GB of usable address-space. –  bcrist Sep 6 '14 at 23:25

At least x86 CPU's don't differentiate signedness of integers at all. There is no separate instructions to "add signed integers" and "add unsigned integers". There is only one instruction, "add integers", which, considering two's complement representation of negative numbers, works regardless of signedness. So on x86 you may expect no any performance penalties on using signed or unsigned integers.

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not for addition or subtraction, but perhaps for multiplication and division, where the instructions do differentiate between signed and unsigned? or perhaps the behavior for the SIMD instructions is different? –  Philipp Jan 17 '11 at 10:58
@philipp Yes, multiplication has different instruction, as the result would depend on interpretation of the sign bit. However, I'm in great doubt that `mul` and `imul` perform with different speeds in the hardware. There should be no measurable difference I guess. –  ulidtko Jan 17 '11 at 11:01
Remembering the Pentium 4 optimization books I read years ago, I think you're wrong here. –  mafu Jan 17 '11 at 12:01
The bit pattern of the result would be the same for signed or unsigned multiplication if the processor does what the C standard mandates for unsigned arithmetic, namely reduction modulo `2^bits`. I would expect that to be the case. –  Daniel Fischer Jan 9 '12 at 17:10

Traditionally `int` is the native integer format of the target hardware platform. Any other integer type may incur performance penalties.

EDIT:

Things are slightly different on modern systems:

• `int` may in fact be 32-bit on 64-bit systems for compatibility reasons. I believe this happens on Windows systems.

• Modern compilers may implicitly use `int` when performing computations for shorter types in some cases.

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yes, traditionally ;-) on current 64-bit systems, `int` is still 32 bits wide, but 64 bit types (`long` or `long long`, depending on the OS) should be at least as fast. –  Philipp Jan 17 '11 at 10:59
`int` is always 32 bits wide on all systems I know (Windows, Linux, Mac OS X, regardless whether the processor is 64-bit or not). It's the `long` type that is different: 32 bits on Windows, but one word on Linux and OS X. –  Philipp Jan 17 '11 at 11:04

IIRC, on x86 signed/unsigned shouldn't make any difference. Short/long, on the other hand, is a different story, since the amount of data that has to be moved to/from RAM is bigger for longs (other reasons may include cast operations like extending a short to long).

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Also bear in mind that certain compilers may have optimizations that don't apply to all integer types. E.g. at least old Intel compilers could not apply autovectorization if the for-loop counter was anything else than a signed int. –  CAFxX Jan 17 '11 at 10:57

The performance difference between signed and unsigned integers is actually more general than the acceptance answer suggests. Division of an unsigned integer by any constant can be made faster than division of a signed integer by a constant, regardless of whether the constant is a power of two. See http://ridiculousfish.com/blog/posts/labor-of-division-episode-iii.html

At the end of his post, he includes the following section:

A natural question is whether the same optimization could improve signed division; unfortunately it appears that it does not, for two reasons:

The increment of the dividend must become an increase in the magnitude, i.e. increment if n > 0, decrement if n < 0. This introduces an additional expense.

The penalty for an uncooperative divisor is only about half as much in signed division, leaving a smaller window for improvements.

Thus it appears that the round-down algorithm could be made to work in signed division, but will underperform the standard round-up algorithm.

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Unsigned integer is advantageous in that you store and treat both as bitstream, I mean just a data, without sign, so multiplication, devision becomes easier (faster) with bit-shift operations

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