# Modulo multiplication (in C)

Specifically: I have two unsigned integers (a,b) and I want to calculate (a*b)%UINT_MAX (UINT_MAX is defined as the maximal unsigned int). What is the best way to do so?

Background: I need to write a module for linux that will emulate a geometric sequence, reading from it will give me the next element (modulo UINT_MAX), the only solution I found is to add the current element to itself times, while adding is done using the following logic:(that I use for the arithmetic sequence)

for(int i=0; i<b; ++i){
if(UINT_MAX - current_value > difference) {
current_value += difference;
} else {
current_value = difference - (UINT_MAX - current_value);
}

when current_value = a in the first iteration (and is updated in every iteration, and difference = a (always). Obviously this is not a intelligent solution. How would an intelligent person achieve this?

Thanks!

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are you not allowed to use the modulus operator or 8 byte integer types? –  davogotland Jan 14 '12 at 14:33
The very simple stupid solution for where "long long" is a longer type than int. long long result = ((long long)a) * ((long long)b) % ((long long)UINT_MAX); –  Joachim Isaksson Jan 14 '12 at 14:43
@JoachimIsaksson result shouldn't have to be of type long long then, right? –  davogotland Jan 14 '12 at 14:55
You probably can use the Chinese Remainder Theorem. See these questions Restore a number from several its remainders and Sum and multiplication modulo –  ypercube Jan 14 '12 at 14:59
I'm looking for a solution that will also work for the "largest" datatype in the system, so using "long long" is not it. @ypercube CRT is hard to use in this case since UINT_MAX=(2^n)-1, isn't it? –  Gilgr Jan 14 '12 at 15:37

As has been mentioned, if you have a type of twice the width available, just use that, here

(unsigned int)(((unsigned long long)a * b) % UINT_MAX)

if int is 32 bits and long long 64 (or more). If you have no larger type, you can split the factors at half the bit-width, multiply and reduce the parts, finally assemble it. Illustrated for 32-bit unsigned here:

a_low = a & 0xFFFF;  // low 16 bits of a
a_high = a >> 16;    // high 16 bits of a, shifted in low half
b_low = b & 0xFFFF;
b_high = b >> 16;
/*
* Now a = (a_high * 65536 + a_low), b = (b_high * 65536 + b_low)
* Thus a*b = (a_high * b_high) * 65536 * 65536
*          + (a_high * b_low + a_low * b_high) * 65536
*          + a_low * b_low
*
* All products a_i * b_j are at most (65536 - 1) * (65536 - 1) = UINT_MAX - 2 * 65536 + 2
* The high product reduces to
* (a_high * b_high) * (UINT_MAX + 1) = (a_high * b_high)
* The middle products are a bit trickier, but splitting again solves:
* m1 = a_high * b_low;
* m1_low = m1 & 0xFFFF;
* m1_high = m1 >> 16;
* Then m1 * 65536 = m1_high * (UINT_MAX + 1) + m1_low * 65536 = m1_high + m1_low * 65536
* Similar for a_low * b_high
* Finally, add the parts and take care of overflow
*/
m1 = a_high * b_low;
m2 = a_low * b_high;
m1_low = m1 & 0xFFFF;
m1_high = m1 >> 16;
m2_low = m2 & 0xFFFF;
m2_high = m2 >> 16;
result = a_high * b_high;
temp = result + ((m1_low << 16) | m1_high);
if (temp < result)    // overflow
{
result = temp+1;
}
else
{
result = temp;
}
if (result == UINT_MAX)
{
result = 0;
}
// I'm too lazy to type out the rest, you get the gist, I suppose.

Of course, if what you need is actually reduction modulo UINT_MAX + 1, as @Toad assumes,then that's just what multiplication of unsigned int does.

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Reduction of unsigned long long mod MAX_INT can be simplified by applying the equation (a*N+b)%(N-1) = (a + b)%(N-1). –  Raymond Chen Jan 14 '12 at 15:27
True, but if a+b overflows, you have to adjust. And if a larger type is available, up- and down-casting solves the problem without splitting the product in high and low bits, so that's conceptually simpler. –  Daniel Fischer Jan 14 '12 at 15:48
Agreed that it is conceptually simpler, but the trick avoids an expensive double-word division –  Raymond Chen Jan 14 '12 at 18:33
Indeed. Although I'm not sure the division would still be slower than shift, add and overflow check on today's processors. But since you know much more about such things than I do, I'll take your word for it. –  Daniel Fischer Jan 14 '12 at 18:59
No inside knowledge here. But most 32-bit processors do not have a native "64 divided divided by 32 yielding 64" instruction. (They may have 64 div 32 to 32.) The 64 div 32 to 64 case is usually implemented in software. –  Raymond Chen Jan 14 '12 at 19:44

EDIT: As pointed out in the comments... this answer applies to Modulo MAX_INT+1 I'll leave it standing here, for future reference.

It's much simpeler than that:

Just multiply the two unsigned ints, the result will also be an unsigned int. Everything which didn't fit in the unsigned int is basically not there. So no need to do a modulo operation:

See example here

#include <stdio.h>

void main()
{
unsigned int a,b;
a = 0x90000000;
b = 2;

unsigned int c = a*b;