# Efficiently implementing floored / euclidean integer division

Floored division is when the result is always floored down (towards −∞), not towards 0:

Is it possible to efficiently implement floored or euclidean integer division in C/C++?

(the obvious solution is to check the dividend's sign)

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Since IEEE-754 specifies round towards -inf as one of the required rounding modes I imagine that the answer to your question is yes. But perhaps you can explain whether you want to know how one would implement the procedure if one were writing the compiler, or to know how to use a particular compiler to perform the operation ?

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Whoops, I meant integer division! I'll amend the question. I'm not sure what does writing compilers have to do with the question, as I've checked and C/C++ does truncated division. –  CyberShadow Nov 4 '10 at 23:49
It's getting convoluted –  belisarius Nov 4 '10 at 23:53
@CyberShadow: so cast the divisor and dividend to floating-point numbers of some kind, use floor and cast the result back to an integer. Or are your looking for some other kind of answer ? –  High Performance Mark Nov 5 '10 at 0:04
I don't think that using floating point is going to be faster than checking the sign... –  CyberShadow Nov 5 '10 at 0:14
@CyberShadow: test and measure. –  High Performance Mark Nov 5 '10 at 0:19

Is it possible to efficiently implement floored or euclidian integer division in C/C++?

Yes.

(the obvious solution is to check the dividend's sign)

I agree completely, and would find it hard to believe there exists an alternative that is significantly faster.

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It could be more efficient to come up with something branch free to correct the result based on the sign, as branches are expensive.

See page 20ff of Chapter 2 in Hacker's Delight on how to access the sign.

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The only thing I can think of involves multiplication of the sign bit with the divisor. –  CyberShadow Nov 5 '10 at 21:22
You can represent certain conditions by 0 or 1 and add these to the result. –  starblue Nov 6 '10 at 7:08

I've written a test program to benchmark the ideas presented here:

``````#include <stdio.h>
#include <stdlib.h>
#include <math.h>
#include <windows.h>

#define N 10000000
#define M 100

int dividends[N], divisors[N], results[N];

__forceinline int floordiv_signcheck(int a, int b)
{
return (a<0 ? a-(b-1) : a) / b;
}

__forceinline int floordiv_signcheck2(int a, int b)
{
return (a - (a<0 ? b-1 : 0)) / b;
}

__forceinline int floordiv_signmultiply(int a, int b)
{
return (a + (a>>(sizeof(a)*8-1))*(b-1)) / b;
}

__forceinline int floordiv_floatingpoint(int a, int b)
{
// I imagine that the call to floor can be replaced to a cast
// if you can get FPU rounding control to work (I couldn't).
return floor((double)a / b);
}

void main()
{
for (int i=0; i<N; i++)
{
dividends[i] = rand();
do
divisors[i] = rand();
while (divisors[i]==0);
}

LARGE_INTEGER t0, t1;

QueryPerformanceCounter(&t0);
for (int j=0; j<M; j++)
for (int i=0; i<N; i++)
results[i] = floordiv_signcheck(dividends[i], divisors[i]);
QueryPerformanceCounter(&t1);

QueryPerformanceCounter(&t0);
for (int j=0; j<M; j++)
for (int i=0; i<N; i++)
results[i] = floordiv_signcheck2(dividends[i], divisors[i]);
QueryPerformanceCounter(&t1);

QueryPerformanceCounter(&t0);
for (int j=0; j<M; j++)
for (int i=0; i<N; i++)
results[i] = floordiv_signmultiply(dividends[i], divisors[i]);
QueryPerformanceCounter(&t1);

QueryPerformanceCounter(&t0);
for (int j=0; j<M; j++)
for (int i=0; i<N; i++)
results[i] = floordiv_floatingpoint(dividends[i], divisors[i]);
QueryPerformanceCounter(&t1);
}
``````

Results:

``````signcheck    :  61458768
signcheck2   :  61284370
signmultiply :  61625076
floatingpoint: 287315364
``````

So, according to my results, checking the sign is the fastest:

``````(a - (a<0 ? b-1 : 0)) / b
``````
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Your timing for all but the first include the `printf` for the previous answer. `printf` is kinda slow, don't know if it's slow enough to affect your results or not. –  Mark Ransom Nov 5 '10 at 22:30
You might also be affected by inlining decisions made by the compiler, it would be worth looking at the generated assembly. Try `double` instead of `float` as there might be conversions happening there as well. –  Mark Ransom Nov 5 '10 at 22:32
Thanks for the suggestions, I've updated the program. Using `double` caused floatingpoint to run a bit faster, but not by much. Otherwise, the result didn't change much. –  CyberShadow Nov 5 '10 at 23:51

Just a note: the x86 `sar` instruction performs floored division when it comes to powers of two.

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