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Where can I find an implementation or library that computes the remainder of an integer euclidean division, 0<=r<|n| ?

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3 Answers

up vote 2 down vote accepted

In C++98 and C++03 versions of C++ language the built-in division (bit / and % operators) might be Euclidean and might be non-Euclidean - it is implementation defined. However, most implementations truncate the quotent towards zero, which is unfortunately non-Euclidean.

In most implementations 5 / -3 = -1 and 5 % -3 = -2. In Euclidean division 5 / -3 = -2 and 5 % -3 = 1.

C++11 requires integer division to be non-Euclidean: it requires an implementation that truncates towards zero.

The issue, as you can see, arises with negative numbers only. So, you can easily implement Euclidean division yourself by using operator % and post-correcting negative reminders

int euclidean_reminder(int a, int b)
{
  assert(b != 0);
  int r = a % b;
  return r >= 0 ? r : r + std::abs(b);
}
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Yes, I don't have c++11 though. What library could I use ? –  NaomiJO Jul 30 '12 at 2:02
    
How could I make your function a #define instead ? –  NaomiJO Jul 30 '12 at 2:10
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It's a simple operator. %.

5 % 4 is 1, etc.

Edit: As has been pointed out, depending on your implementation this isn't necessarily a euclidean mod.

#define EUCMOD(a, b)  (a < 0 ? (((a % b) + b) % b) : (a % b))
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Note this only works with integers. If you want floating-point modulus, use the fmod function. fmod (3.3, 2.4) is 0.9 –  chris Jul 30 '12 at 1:55
    
No, I said an euclidian division. (-5)%4 is -1 but should be 3. As I said in the question, the remainder r should be between 0 and n, and in my example it's negative. –  NaomiJO Jul 30 '12 at 1:58
    
@NaomiJO, If you really need to, you can just add the b from a % b onto the result if it's negative. –  chris Jul 30 '12 at 2:02
    
That's actually incorrect. In most implementations division truncates the result towards zero - this is non-Euclidean division. This means that the result of % can be negative: this is non-Euclidean already. –  AndreyT Jul 30 '12 at 2:04
    
Is there no library that implements this behaviour, am I forced to do it myself ? –  NaomiJO Jul 30 '12 at 2:07
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Try (x%m + m)%m if the result must be positive.

Write your own function around this, or any of the variants, and don't get hung up on a library - you've spent more time asking than you would to just do it. Start your own library (toolbox) for simple functions you need.

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Yes that works, thanks. Is there no library that implements this function ? It seems fairly common... –  NaomiJO Jul 30 '12 at 2:05
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