Question

8 bits representing the number 7 look like this:

00000111

Three bits are set. What is the best algorithm to determine the number of set bits in a 32-bit integer?

Answer 1

This is known as the 'Hamming Weight', 'popcount' or 'sideways addition'.

The 'best' algorithm really depends on which CPU you are on and what your usage pattern is.

Some CPUs have a single built-in instruction to do it, and others have parallel instructions which act on bit vectors. The parallel instructions will almost certainly be fastest, however, the single-instruction algorithms are 'are usually microcoded loops that test a bit per cycle; a log-time algorithm coded in C is often faster'.

A pre-populated table lookup method can be very fast if your CPU has a large cache and/or you are doing lots of these instructions in a tight loop. However it can suffer because of the expense of a 'cache miss', where the CPU has to fetch some of the table from main memory.

If you know that your bytes will be mostly 0's or mostly 1's then there are very efficient algorithms for these scenarios.

I believe a very good general purpose algorithm is the following, known as 'parallel' or 'variable-precision SWAR algorithm':

int NumberOfSetBits(int i)
{
    i = i - ((i >> 1) & 0x55555555);
    i = (i & 0x33333333) + ((i >> 2) & 0x33333333);
    return ((i + (i >> 4) & 0xF0F0F0F) * 0x1010101) >> 24;
}

This is because it has the best worst-case behaviour of any of the algorithms discussed, so will efficiently deal with any usage pattern or values you throw at it.

References:

http://graphics.stanford.edu/~seander/bithacks.html

http://en.wikipedia.org/wiki/Hamming_weight

http://gurmeetsingh.wordpress.com/2008/08/05/fast-bit-counting-routines/

http://aggregate.ee.engr.uky.edu/MAGIC/#Population%20Count%20(Ones%20Count)

Answer 2

Brian Kernighan's method goes through as many iterations as there are set bits. So if we have a 32-bit word with only the high bit set, then it will only go once through the loop.

Published in 1988, the C Programming Language 2nd Ed. (by Brian W. Kernighan and Dennis M. Ritchie) mentions this in exercise 2-9. On April 19, 2006 Don Knuth pointed out to him that this method "was first published by Peter Wegner in CACM 3 (1960), 322. (Also discovered independently by Derrick Lehmer and published in 1964 in a book edited by Beckenbach.)"

long count_bits(long n) {     
  unsigned int c; // c accumulates the total bits set in v
  for (c = 0; n; c++) 
    n &= n - 1; // clear the least significant bit set
  return c;
}

Note that this is an question used during interviews. The interviewer will add the caveat that you have "infinite memory". In that case, you basically create an array of size 2³² and fill in the bit counts for the numbers at each location. Then, this function becomes O(1).

Answer 3

Why not iteratively divide by 2?

count = 0
while n > 0
  if (n % 2) == 1
    count += 1
  n /= 2  

EDIT: Matt, I don't currently have enough reputation to comment... :P. I agree that this isn't the fastest, but "best" is somewhat ambiguous. I'd argue though that "best" should have an element of clarity

Answer 4

If you happen to be using Java, the built-in method Integer.bitCount will do that.

Answer 5

Also consider the build-in functions of your compilers.

On the GNU compiler for example you can just use:

  int __builtin_popcount (unsigned int x);

In the worst case the compiler will generate a call to a function. In the best case the compiler will emit a cpu instruction to do the same job faster.

The GCC intrinsics even work across multiple platforms. Popcount will become mainstream in the x86 architecture, so it makes sense to start using the intrinsic now. Other architectures have the popcount for years.

Answer 6

What do you means with "Best algorithm"? The shorted code or the fasted code? Your code look very elegant and it has a constant execution time. The code is also very short.

But if the speed is the major factor and not the code size then I think the follow can be faster:

       static final int[] BIT_COUNT = { 0, 1, 1, ... 256 values with a bitsize of a byte ... };
        static int bitCountOfByte( int value ){
            return BIT_COUNT[ value & 0xFF ];
        }

        static int bitCountOfInt( int value ){
            return bitCountOfByte( value ) 
                 + bitCountOfByte( value >> 8 ) 
                 + bitCountOfByte( value >> 16 ) 
                 + bitCountOfByte( value >> 24 );
        }

I think that this will not more faster for a 64 bit value but a 32 bit value can be faster.

Answer 7

From Hacker's Delight, p. 66, Figure 5-2

int pop(unsigned x)
{
    x = x - ((x >> 1) & 0x55555555);
    x = (x & 0x33333333) + ((x >> 2) & 0x33333333);
    x = (x + (x >> 4)) & 0x0F0F0F0F;
    x = x + (x >> 8);
    x = x + (x >> 16);
    return x & 0x0000003F;
}

Executes in ~20-ish instructions (arch dependent), no branching.

Hacker's Delight is delightful! Highly recommended.

Answer 8

In my opinion, the "best" solution is the one that can be read by another programmer (or the original programmer two years later) without copious comments. You may well want the fastest or cleverest solution which some have already provided but I prefer readability over cleverness anytime.

unsigned int bitCount (unsigned int value) {
    unsigned int count = 0;
    while (value > 0) {           // until all bits are zero
        if ((value & 1) == 1) {   // check lower bit
            count++;
        }
        value /= 2;               // shift bits, removing lower bit
    }
    return count;
}

Answer 9

For a happy medium between a 2³² lookup table and iterating through each bit individually:

int bitcount(unsigned int num){
    int count = 0;
    static int nibblebits[] =
        {0, 1, 1, 2, 1, 2, 2, 3, 1, 2, 2, 3, 2, 3, 3, 4};
    for(; num != 0; num >>= 4)
        count += nibblebits[num & 0x0f];
    return count;
}

From http://ctips.pbwiki.com/CountBits

Answer 10

I'm particularly fond of this example from the fortune file:

#define BITCOUNT(x)    (((BX_(x)+(BX_(x)>>4)) & 0x0F0F0F0F) % 255)
#define BX_(x)         ((x) - (((x)>>1)&0x77777777)
                             - (((x)>>2)&0x33333333)
                             - (((x)>>3)&0x11111111))

I like it best because it's so pretty!

Answer 11

The function you are looking for is often called the "sideways sum" or "population count" of a binary number. Knuth discusses it in pre-Fascicle 1A, pp11-12 (although there was a brief reference in Volume 2, 4.6.3-(7).)

The locus classicus is Peter Wegner's article "A Technique for Counting Ones in a Binary Computer", from the Communications of the ACM, Volume 3 (1960) Number 5, page 322. He gives two different algorithms there, one optimized for numbers expected to be "sparse" (i.e., have a small number of ones) and one for the opposite case.

Answer 12

I got bored, and timed a billion iterations of three approaches. Compiler is gcc -O3. CPU is whatever they put in the 1st gen Macbook Pro.

Fastest is the following, at 3.7 seconds:

static unsigned char wordbits[65536] = { bitcounts of ints between 0 and 65535 };
static int popcount( unsigned int i )
{
    return( wordbits[i&0xFFFF] + wordbits[i>>16] );
}

Second place goes to the same code but looking up 4 bytes instead of 2 halfwords. That took around 5.5 seconds.

Third place goes to the bit-twiddling 'sideways addition' approach, which took 8.6 seconds.

Fourth place goes to GCC's __builtin_popcount(), at a shameful 11 seconds.

The counting one-bit-at-a-time approach was waaaay slower, and I got bored of waiting for it to complete.

So if you care about performance above all else then use the first approach. If you care, but not enough to spend 64Kb of RAM on it, use the second approach. Otherwise use the readable (but slow) one-bit-at-a-time approach.

It's hard to think of a situation where you'd want to use the bit-twiddling approach.

Edit: Similar results here.

Answer 13

This is one of those questions where it helps to know your micro-architecture. I just timed two variants under gcc 4.3.3 compiled with -O3 using C++ inlines to eliminate function call overhead, one billion iterations, keeping the running sum of all counts to ensure the compiler doesn't remove anything important, using rdtsc for timing (clock cycle precise).

inline int pop2(unsigned x, unsigned y)
{
    x = x - ((x >> 1) & 0x55555555);
    y = y - ((y >> 1) & 0x55555555);
    x = (x & 0x33333333) + ((x >> 2) & 0x33333333);
    y = (y & 0x33333333) + ((y >> 2) & 0x33333333);
    x = (x + (x >> 4)) & 0x0F0F0F0F;
    y = (y + (y >> 4)) & 0x0F0F0F0F;
    x = x + (x >> 8);
    y = y + (y >> 8);
    x = x + (x >> 16);
    y = y + (y >> 16);
    return (x+y) & 0x000000FF;
}

The unmodified Hacker's Delight took 12.2 gigacycles. My parallel version (counting twice as many bits) runs in 13.0 gigacycles. 10.5s total elapsed for both together on a 2.4GHz Core Duo. 25 gigacycles = just over 10 seconds at this clock frequency, so I'm confident my timings are right.

This has to do with instruction dependency chains, which are very bad for this algorithm. I could nearly double the speed again by using a pair of 64-bit registers. In fact, if I was clever and added x+y a little sooner I could shave off some shifts. The 64-bit version with some small tweaks would come out about even, but count twice as many bits again.

With 128 bit SIMD registers, yet another factor of two, and the SSE instruction sets often have clever short-cuts, too.

There's no reason for the code to be especially transparent. The interface is simple, the algorithm can be referenced on-line in many places, and it's amenable to comprehensive unit test. The programmer who stumbles upon it might even learn something. These bit operations are extremely natural at the machine level.

OK, I decided to bench the tweaked 64-bit version. For this one sizeof(unsigned long) == 8

inline int pop2(unsigned long x, unsigned long y)
{
    x = x - ((x >> 1) & 0x5555555555555555);
    y = y - ((y >> 1) & 0x5555555555555555);
    x = (x & 0x3333333333333333) + ((x >> 2) & 0x3333333333333333);
    y = (y & 0x3333333333333333) + ((y >> 2) & 0x3333333333333333);
    x = (x + (x >> 4)) & 0x0F0F0F0F0F0F0F0F;
    y = (y + (y >> 4)) & 0x0F0F0F0F0F0F0F0F;
    x = x + y; 
    x = x + (x >> 8);
    x = x + (x >> 16);
    x = x + (x >> 32); 
    return x & 0xFF;
}

That looks about right (I'm not testing carefully, though). Now the timings come out at 10.70 gigacycles / 14.1 gigacycles. That later number summed 128 billion bits and corresponds to 5.9s elapsed on this machine. The non-parallel version speeds up a tiny bit because I'm running in 64-bit mode and it likes 64-bit registers slightly better than 32-bit registers.

Let's see if there's a bit more OOO pipelining to be had here. This was a bit more involved, so I actually tested a bit. Each term alone sums to 64, all combined sum to 256.

inline int pop4(unsigned long x, unsigned long y, 
                unsigned long u, unsigned long v)
{
  enum { m1 = 0x5555555555555555, 
         m2 = 0x3333333333333333, 
         m3 = 0x0F0F0F0F0F0F0F0F, 
         m4 = 0x000000FF000000FF };

    x = x - ((x >> 1) & m1);
    y = y - ((y >> 1) & m1);
    u = u - ((u >> 1) & m1);
    v = v - ((v >> 1) & m1);
    x = (x & m2) + ((x >> 2) & m2);
    y = (y & m2) + ((y >> 2) & m2);
    u = (u & m2) + ((u >> 2) & m2);
    v = (v & m2) + ((v >> 2) & m2);
    x = x + y; 
    u = u + v; 
    x = (x & m3) + ((x >> 4) & m3);
    u = (u & m3) + ((u >> 4) & m3);
    x = x + u; 
    x = x + (x >> 8);
    x = x + (x >> 16);
    x = x & m4; 
    x = x + (x >> 32);
    return x & 0x000001FF;
}

I was excited for a moment, but it turns out gcc is playing inline tricks with -O3 even though I'm not using the inline keyword in some tests. When I let gcc play tricks, a billion calls to pop4() takes 12.56 gigacycles, but I determined it was folding arguments as constant expressions. A more realistic number appears to be 19.6gc for another 30% speed-up. My test loop now looks like this, making sure each argument is different enough to stop gcc from playing tricks.

   hitime b4 = rdtsc(); 
   for (unsigned long i = 10L * 1000*1000*1000; i < 11L * 1000*1000*1000; ++i) 
      sum += pop4 (i,  i^1, ~i, i|1); 
   hitime e4 = rdtsc(); 

256 billion bits summed in 8.17s elapsed. Works out to 1.02s for 32 million bits as benchmarked in the 16-bit table lookup. Can't compare directly, because the other bench doesn't give a clock speed, but looks like I've slapped the snot out of the 64KB table edition, which is a tragic use of L1 cache in the first place.

Update: decided to do the obvious and create pop6() by adding four more duplicated lines. Came out to 22.8gc, 384 billion bits summed in 9.5s elapsed. So there's another 20% Now at 800ms for 32 billion bits.