# Finding how many bits are on in a number

I know how to find out how many bits are on in a given number (or how many elements are true in a boolean arra), using a mask and bitwise operators, going over all bits checking if they are on. Assuming the number is of arbitrary length, the algorithm runs in O(n) time, where n is the number of bits in the number. Is there an asymptotically better algorithm? I don't think that's possible, but how can I formally prove it?

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show us some code –  shiplu.mokadd.im Dec 11 '12 at 15:45
@shiplu.mokadd.im: did you read the question? why should he post code? –  duedl0r Dec 11 '12 at 15:46
@shiplu.mokadd.im, the question doesn't refer to code. His existing code works. It's asking if another solution exists. –  joerick Dec 11 '12 at 15:47
Depends on what you mean, you need to read all data, so `O(n)` is minimum on sequential machine. However, if `n` is smaller than word size you can do thing in parallel. Using C instructions in `O(lg n)`. Many processors can do this in `O(1)` time. –  zch Dec 11 '12 at 15:56
@Idan Suppose we have algorithm, that is faster than `O(n)`. It means that for some input it will run is less than `n` time. So it can't access all data (what it exactly means depends on computation model). We flip one bit, which was not accessed. Algorithm will give the same result, but this time it isn't correct (it's off by one). Contradiction. –  zch Dec 11 '12 at 16:29

I think the type of formality you're looking for is an "adversarial proof".

Suppose one has an algorithm A that runs faster than O(n). Then for sufficiently large n, A must not look at some bit i. We then claim that A must be incorrect. An "adversary" will give A two strings s1 and s2 that are identical except for opposite values of bit i. The algorithm A will return the same value for s1 and s2, so the adversary has "tricked" A into giving the wrong answer. So no correct algorithm A running in o(n) time exists.

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Bit Twiddling Hacks presents a number of methods, including this one:

### Counting bits set, Brian Kernighan's way

``````unsigned int v; // count the number of bits set in v
unsigned int c; // c accumulates the total bits set in v
for (c = 0; v; c++)
{
v &= v - 1; // clear the least significant bit set
}
``````

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.

Examples of the algorithm in action:

### 128 == 100000002, 1 bit set

``````128 & 127 ==   0    10000000 & 01111111 == 00000000
``````

### 177 == 101100012, 4 bits set

``````177 & 176 == 176    10110001 & 10110000 == 10110000
176 & 175 == 160    10110000 & 10101111 == 10100000
160 & 159 == 128    10100000 & 10011111 == 10000000
128 & 127 ==   0    10000000 & 01111111 == 00000000
``````

### 255 == 111111112, 8 bits set

``````255 & 254 == 254    11111111 & 11111110 == 11111110
254 & 253 == 252    11111110 & 11111101 == 11111100
252 & 251 == 248    11111100 & 11111011 == 11111000
248 & 247 == 240    11111000 & 11110111 == 11110000
240 & 239 == 224    11110000 & 11101111 == 11100000
224 & 223 == 192    11100000 & 11011111 == 11000000
192 & 191 == 128    11000000 & 10111111 == 10000000
128 & 127 ==   0    10000000 & 01111111 == 00000000
``````

As for the language agnostic question of algorithmic complexity, it is not possible to do better than O(n) where n is the number of bits. Any algorithm must examine all of the bits in a number.

What's tricky about this is when you aren't careful about the definition of n and let n be "the number of bit shifting/masking instructions" or some such. If n is the number of bits then even a simple bit mask (`&`) is already an O(n) operation.

So, can this be done in better than O(n) bit tests? No.

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Still O(n), so it's not asymptotically better. –  Charlie Martin Dec 11 '12 at 15:50
@CharlieMartin It's O(number of 1 bits) which is less than or equal to O(number of bits). –  John Kugelman Dec 11 '12 at 15:51
@john Thanks, That's an awesome algorithm. Doesn't v&(v-1) clear the most significant bit? Also, it's still worst case o(n), so I'm mainly interested in proving you can't get any better than that. –  nodwj Dec 11 '12 at 15:58
About the first question, it does clear the least significant bit, my bad –  nodwj Dec 11 '12 at 16:14
But if I allow such bit operations, is there an asymptotically better algorithm than O(n), where n is the length of the number? –  nodwj Dec 11 '12 at 17:40

I always use this:

``````int
count_bits(uint32_t v)
{
v = v - ((v >> 1) & 0x55555555);
v = (v & 0x33333333) + ((v >> 2) & 0x33333333);
return ((v + (v >> 4) & 0xf0f0f0f) * 0x1010101) >> 24;
}
``````

You have to know the size of your integers.

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

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If you could explain what this does, it might be worth an upvote. –  Colin D Dec 11 '12 at 15:53
hahaha. nice, gonna try it out right now. +1 –  davak Dec 11 '12 at 15:53
@ColinD Sorry. Can't remember. I just know it works well enough to count matches after performing intersections of large bitmaps. And I remember that the 64 bit version didn't change performance, so I stayed with the 32 bits version because it didn't spill over 80 columns (yes, that old). –  Art Dec 11 '12 at 16:03
This solution is not scalable to `arbitrary length` bit strings. The solution cited works up to 32 bit strings. The source link has a method that goes up to 128 bits. –  Colin D Dec 11 '12 at 16:05
First line counts pairs of bits, the 'and' is used to ensure the subtract does not overflow between pairs. After this line each two bit pair is the count of the bits in the original pair. The rest is summing up - first pairs to nibbles, then nibbles to bytes, and then the multiply sums the bytes such that the top byte is the total (other bytes are sub-totals). As you add one operation every time the number of bits doubles, this should be O(log n). –  JasonD Dec 11 '12 at 16:05

Brian Kerninghan's algorithm to count 1-bits.

``````unsigned int v; // count the number of bits set in v
unsigned int c; // c accumulates the total bits set in v
for (c = 0; v; c++)
{
v &= v - 1; // clear the least significant bit set
}
``````

Read this and other bit-twiddling hacks here: Bit-twiddling hacks.

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The fastest way to do this calculation is with a table array edx[bl] where the bl register contains a byte value. If the number is a single byte then the answer is one instruction:

`````` mov eax, [edx:bl]
``````

If the number has many bytes in it (say an array pointed to by ebp), then you loop through the bytes (where ecx is the number of bytes in the array containing the number):

``````    sub ecx, 1
mov eax, 0
DoNextByte:
mov bl, [ebp:ecx]
test ecx, ecx
jz Done:
sub ecx, 1
jmp DoNextByte:
Done:
``````

This is the absolute fastest way to do this and will be faster than any mathematical computation. Note that the shift instructions in Art's solution are very CPU expensive.

The problem with Kernighan's solution is that even when hand-coded in assembly it is slower than my algorithm. If it is compiled C it will probably generate a lot of memory accesses that will slow it down even beyond the larger number of clock cycles it requires.

Note that if the byte-to-count mapping is inlined right next to this instruction then the whole data table will be in the CPU cache so it will be really fast. In this case, no C program will even come close (think 20x slower or more).

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Assuming you know what the CPU will put into cache with 100% certainty is a very large mistake. Also, I don't see this as being any different from @ap's answer –  Earlz Dec 11 '12 at 20:42
The Kernighan algorithm will loop an average of 4 times for every byte in the number. That means you will have an increment, a compare and an AND op x 4 for every byte, not including memory accesses. So it is guaranteed to be slower than a table lookup. If the table is inlined the chance that it is in the L1 cache is 99.99% in which case the table version will be mucho grande faster than the kernighan. –  Tyler Durden Dec 11 '12 at 20:55
Thanks, it helped me. Though I don't need a fast algorithm for anything in particular, I'm mainly interested in proving there doesn't exist an asymptotically better algorithm –  nodwj Dec 11 '12 at 21:02
Proving things is the devil's work. –  Tyler Durden Dec 11 '12 at 21:10

Well, you can also use a lookup table holding the #bits for each byte and then divide the number into bytes, adding up the lookup values.

It will be still O(number of bits) but with a small factor.

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Okay, there seems to be some confusion here about order statistics, asymptotic notation, "big O".

It is correct that Brian Kernighan's algorithm is better in terms of number of operations. It is, however, not correct that it is asymptotically better.

This can be seen from the definition of big-O.

Recall that by definition a function is O(f(n)) when there exists a function g(n) such that f(n) ≤ k g(n) when n grows sufficiently large.

Now, let's define w to be the number of bits set in the word, and further note that the run time for a single word, as has been observed above, is a function of the number of bits set. Call that function c(w). We know that there's a fixed word width, call it ww; clearly for any word, 0 ≤ c(w)ww, and of course, worst case is that c(w) = c(ww). So, the run time of this algorithm is, at worst, n c(ww).

Thus, for n, the run time is ≤ n c(ww); that is, nn c(ww), and thus by definition, this algorithm has an asymptotic worst-case run time of O(n).

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