What is the efficient way to count set bits at a position or lower?

Given `std::bitset<64> bits` with any number of bits set and a bit position `X` (0-63)

What is the most efficient way to count bits at position X or lower or return 0 if the bit at X is not set

Note: If the bit is set the return will always be at least 1

The brute force way is very slow:

``````int countupto(std::bitset<64> bits, int X)
{
if (!bits[X]) return 0;
int total=1;
for (int i=0; i < X; ++i)
{
total+=bits[i];
}
}
``````

The `count()` methof of `bitset` will give you the `popcount` of all the bits, but `bitset` does not support ranges

Note: This is not a dup of How to count the number of set bits in a 32-bit integer? as that asks about all bits not the range 0 through X

• Is 64 a fact or just an example? More generally: do your bits always fit into an integer? Dec 22, 2015 at 2:15
• @5gon12eder they fit into a long long (64 bits) Dec 22, 2015 at 2:16
• Then I think Jerry Coffin's answer will be your best option. (Or any of the other answers for that matter.) Dec 22, 2015 at 2:17

This C++ gets g++ to emit very good x86 ASM (godbolt compiler explorer). I expect it will compile efficiently on other 64bit architectures, too (if there's a HW popcount for `std::bitset::count` to use, otherwise that'll always be the slow part; e.g. sure to use `g++ -march=nehalem` or higher, or `-mpopcnt` if you don't want to enable anything else, if you can limit your code to only running on CPUs that support that x86 instruction):

``````#include <bitset>

int popcount_subset(std::bitset<64> A, int pos) {
int high_bits_to_eliminate = 63 - pos;
A <<= (high_bits_to_eliminate & 63);  // puts A[pos] at A[63].

return (A[63]? ~0ULL : 0) & A.count();  // most efficient way: great code with gcc and clang
// see the godbolt link for some #ifdefs with other ways to do the check, like
// return A[BSET_SIZE-1] ? A.count() : 0;
}
``````

This probably isn't optimal on 32bit architectures, so compare other alternatives if you need to make a 32bit build.

This will work for other sizes of bitset, as long as you do something about the hard-coded `63`s, and change the `& 63` mask for the shift count into a more general range-check. For optimal performance with strange size bitsets, make a template function with a specialization for `size <= register width` of the target machine. In that case, extract the bitset to an `unsigned` type of the appropriate width, and shift to the top of the register instead of the top of the bitset.

You'd expect this to also generate ideal code for `bitset<32>`, but it doesn't quite. gcc/clang still use 64bit registers on x86-64.

For large bitsets, shifting the whole thing will be slower than just popcounting the words below the one containing `pos`, and using this on that word. (This is where a vectorized popcount really shines on x86 if you can assume SSSE3 but not the `popcnt` insn hardware support, or for 32bit targets. AVX2 256bit `pshufb` is the fastest way to do bulk popcounts, but without AVX2 I think 64bit `popcnt` is pretty close to a 128-bit `pshufb` implementation. See the comments for more discussion.)

If you have an array of 64-bit elements, and want to count bits below a certain position in each one separately, then you definitely should use SIMD. The shift parts of this algorithm vectorize, not just the popcnt part. Use `psadbw` against an all-zero register to horizontal-sum bytes in 64-bit chunks after a `pshufb`-based popcnt that produces counts for the bits in each byte separately. SSE/AVX doesn't have 64-bit arithmetic right shift, but you can use a different technique to blend on the high bit of each element.

How I came up with this:

The asm instructions you want to get the compiler to output will:

1. remove the unwanted bits from the 64bit value
2. test the highest of the wanted bits.
3. popcount it.
4. return 0 or popcount, depending on the result of the test. (Branchless or branching implementations both have advantages. If the branch is predictable, a branchless implementation tends to be slower.)

The obvious way to do 1 is to generate a mask (`(1<<(pos+1)) -1`) and `&` it. A more efficient way is to left-shift by `63-pos`, leaving the bits you want packed at the top of a register.

This also has the interesting side-effect of putting the bit you want to test as the top bit in the register. Testing the sign bit, rather than any other arbitrary bit, takes slightly fewer instructions. An arithmetic right shift can broadcast the sign bit to the rest of the register, allowing for more-efficient-than-usual branchless code.

Doing the popcount is a much-discussed problem, but is actually the trickier part of the puzzle. On x86, there is extremely efficient hardware support for it, but only on recent-enough hardware. On Intel CPUs, the `popcnt` instruction is only available on Nehalem and newer. I forget when AMD added support.

So to use it safely, you need to either do CPU dispatching with a fallback that doesn't use `popcnt`. Or, make separate binaries that do/don't depend on some CPU features.

popcount without the `popcnt` instruction can be done a few ways. One uses SSSE3 `pshufb` to implement a 4-bit LUT. This is most effective when used on a whole array, rather than a single 64b at a time, though. Scalar bithacks might be best here, and wouldn't require SSSE3 (and so would be compatible with ancient AMD CPUs that have 64bit but not pshufb.)

`(A[63]? ~0ULL : 0)` asks the compiler to broadcast the high bit to all other bit positions, allowing it to be used as an AND-mask to zero (or not) the popcount result. Note that even for large bitset sizes, it's still only masking the output of `popcnt`, not the bitset itself, so `~0ULL` is fine I used ULL to make sure wasn't ever asking the compiler to broadcast the bit only to the low 32b of a register (with `UL` on Windows, for example).

This broadcast can be done with an arithmetic right shift by 63, which shifts in copies of the high bit.

clang generated this code from the original version. After some prodding from Glenn about different implementations for 4, I realized that I could lead gcc towards clang's optimal solution by writing the source more like the ASM I want. The obvious `((int64_t)something) >> 63` to more directly request an arithmetic right shift would not be strictly portable, because signed right-shifts are implementation-defined as either arithmetic or logical. The standard doesn't provide any portable arithmetic right-shift operator. (It's not undefined behaviour, though.) Anyway, fortunately compilers are smart enough: gcc sees the best way once you give it enough of a hint.

This source makes great code on x86-64 and ARM64 with gcc and clang. Both simply use an arithmetic right shift on the input to popcnt (so the shift can run in parallel with the popcnt). It also compiles great on 32bit x86 with gcc, because the masking only happens to a 32bit variable (after multiple popcnt results are added). It's the rest of the function that's nasty on 32bit (when the bitset is larger than a register).

Original ternary-operator version with gcc

Compiled with gcc 5.3.0 `-O3 -march=nehalem -mtune=haswell` (older gcc, like 4.9.2, also still emit this):

``````; the original ternary-operator version.  See below for the optimal version we can coax gcc into emitting.
popcount_subset(std::bitset<64ul>, int):
; input bitset in rdi, input count in esi (SysV ABI)
mov     ecx, esi    ; x86 variable-count shift requires the count in cl
xor     edx, edx    ; edx=0
xor     eax, eax    ; gcc's workaround for popcnt's false dependency on the old value of dest, on Intel
not     ecx         ; two's complement bithack for 63-pos (in the low bits of the register)
sal     rdi, cl     ; rdi << ((63-pos) & 63);  same insn as shl (arithmetic == logical left shift)
popcnt  rdx, rdi
test    rdi, rdi    ; sets SF if the high bit is set.
cmovs   rax, rdx    ; conditional-move on the sign flag
ret
``````

See How to prove that the C statement -x, ~x+1, and ~(x-1) yield the same results? for background on gcc's use of the `-x == ~x + 1` two's complement identity. (And Which 2's complement integer operations can be used without zeroing high bits in the inputs, if only the low part of the result is wanted? which tangentially mentions that `shl` masks the shift count, so we only need the low 6 bits of `ecx` to hold `63 - pos`. Mostly linking that because I wrote it recently and anyone still reading this paragraph might find it interesting.)

Some of those instructions will go away when inlining. (e.g. gcc would generate the count in ecx in the first place.)

With Glenn's multiply instead of ternary operator idea (enabled by `USE_mul`), gcc does

``````    shr     rdi, 63
imul    eax, edi
``````

at the end instead of `xor` / `test` / `cmovs`.

Haswell perf analysis, using microarch data from Agner Fog (Multiply version):

• `mov r,r`: 1 fused-domain uop, 0 latency, no execution unit
• `xor`-zeroing: 1 fused-domain uop, no execution unit
• `not`: 1 uop for p0/p1/p5/p6, 1c latency, 1 per 0.25c throughput
• `shl` (aka `sal`) with count in `cl`: 3 uops for p0/p6: 2c latency, 1 per 2c throughput. (Agner Fog's data indicates that IvyBridge only takes 2 uops for this, strangely.)
• `popcnt`: 1 uop for p1, 3c latency, 1 per 1c throughput
• `shr r,imm`: 1 uop for p0/p6, 1c latency. 1 per 0.5c throughput.
• `imul r,r`: 1uop for p1, 3c latency.
• not counting the `ret`

Totals:

• 9 fused-domain uops, can issue in 2.25 cycles (in theory; uop cache-line effects usually bottleneck the frontend slightly).
• 4 uops (shifts) for p0/p6. 2 uops for p1. 1 any-ALU-port uop. Can execute at one per 2c (saturating the shift ports), so the frontend is the worst bottleneck.

Latency: Critical path from when the bitset is ready to when the result is: `shl`(2) -> `popcnt`(3) -> `imul`(3). Total 8 cycles. Or 9c from when `pos` is ready, because the `not` is an extra 1c latency for it.

The optimal `bitbroadcast` version replaces `shr` with `sar` (same perf), and `imul` with `and` (1c latency instead of 3c, runs on any port). So the only perf change is reducing the critical path latency to 6 cycles. Throughput is still bottlenecked on the frontend. `and` being able to run on any port doesn't make a difference, unless you're mixing this with code that bottlenecks on port1 (instead of looking at the throughput for running just this code in a tight loop).

cmov (ternary operator) version: 11 fused-domain uops (frontend: one per 2.75c). execution units: still bottlenecked on the shift ports (p0/p6) at one per 2c. Latency: 7c from bitset to result, 8c from pos to result. (`cmov` is 2c latency, 2 uops for any of p0/p1/p5/p6.)

Clang has some different tricks up its sleeve: Instead of `test`/`cmovs`, it generates a mask of either all-ones or all-zeros by using an arithmetic right-shift to broadcast the sign bit to all positions of a register. I love it: Using `and` instead of `cmov` is more efficient on Intel. It still has the data-dependency and does the work for both sides of the branch (which is the main downside to cmov in general), though. Update: with the right source code, gcc will use this method, too.

``````popcount_subset(std::bitset<64ul>, int):
mov     ecx, 63
sub     ecx, esi      ; larger code size, but faster on CPUs without mov-elimination
shl     rdi, cl       ; rdi << ((63-pos) & 63)
popcnt  rax, rdi      ; doesn't start a fresh dep chain before this, like gcc does
sar     rdi, 63       ; broadcast the sign bit
and     eax, edi      ; eax = 0 or its previous value
ret
``````

`sar / and` replaces `xor / test / cmov`, and `cmov` is a 2-uop instruction on Intel CPUs, so that's really nice. (For the ternary-operator version).

Clang still does the `sar / and` trick instead of an actual `imul` when using the multiply source version, or the "bitbroadcast" source version. So those help gcc without hurting clang. (`sar/and` is definitely better than `shr/imul`: 2c less latency on the critical path.) The `pow_of_two_sub` version does hurt clang (see the first godbolt link: omitted from this answer to avoid clutter with ideas that didn't pan out).

The `mov ecx, 63` / `sub ecx, esi` is actually faster on CPUs without mov-elimination for reg,reg moves (zero latency and no execution port, handled by register renaming). This includes Intel pre-IvyBridge, but not more recent Intel and AMD CPUs.

Clang's `mov imm` / `sub` method puts only one cycle of latency for `pos` onto the critical path (beyond the bitset->result latency), instead of two for a `mov ecx, esi` / `not ecx` on CPUs where `mov r,r` has 1c latency.

With BMI2 (Haswell and later), an optimal ASM version can save a `mov` to `ecx`. Everything else works the same, because `shlx` masks its shift-count input register down to the operand-size, just like `shl`.

x86 shift instructions have crazy CISC semantics where if the shift count is zero, the flags aren't affected. So variable-count shift instructions have a (potential) dependency on the old value of the flags. "Normal" x86 `shl r, cl` decodes to 3 uops on Haswell, but BMI2 `shlx r, r, r` is only 1. So it's too bad that gcc still emits `sal` with `-march=haswell`, instead of using `shlx` (which it does use in some other cases).

``````// hand-tuned BMI2 version using the NOT trick and the bitbroadcast
popcount_subset(std::bitset<64ul>, int):
not     esi           ; The low 6 bits hold 63-pos.  gcc's two-s complement trick
xor     eax, eax      ; break false dependency on Intel.  maybe not needed when inlined.
shlx    rdi, rdi, rsi ; rdi << ((63-pos) & 63)
popcnt  rax, rdi
sar     rdi, 63       ; broadcast the sign bit: rdi=0 or -1
and     eax, edi      ; eax = 0 or its previous value
ret
``````

Perf analysis for Intel Haswell: 6 fused-domain uops (frontend: one per 1.5c). Execution units: 2 p0/p6 shift uops. 1 p1 uop. 2 any-port uops: (one per 1.25c from total execution port limits). Critical path latency: `shlx`(1) -> `popcnt`(3) -> `and`(1) = 5c bitset->result. (or 6c from `pos`->result).

Note that when inlining, a human (or smart compiler) could avoid the need for the `xor eax, eax`. It's only there because of `popcnt`'s false dependency on the output register (on Intel), and we need the output in `eax` (which the caller may have used recently for a long dep chain). With `-mtune=bdver2` or something, gcc won't zero the register it's going to use for `popcnt` output.

When inlining, we could use an output register that already has to be ready at least as early as `popcnt`'s source reg to avoid the problem. Compilers will do an in-place `popcnt rdi,rdi` when the source isn't needed later, but that's not the case here. Instead, we can pick another register that already has to be ready before the source. `popcnt`'s input depends on `63-pos`, and we can clobber it, so `popcnt rsi,rdi`'s dependency on rsi can't delay it. Or if we had `63` in a register, we could `popcnt rsi,rdi` / `sarx rax, rsi, reg_63` / `and eax, esi`. Or BMI2 3-operand shift instructions would also let us not clobber inputs in case they're needed afterwards.

This is so light-weight that loop overhead and setting up the input operands / storing the results are going to be major factors. (And the `63-pos` can optimize away with a compile-time constant, or into wherever a variable count comes from.)

The Intel compiler amusingly shoots itself in the foot and doesn't take advantage of the fact that A[63] is the sign bit. `shl` / `bt rdi, 63` / `jc`. It even sets up the branches in a really dumb way. It could zero eax, and then jump over popcnt or not based on the sign flag set by `shl`.

An optimal branching implementation, starting from ICC13 output from `-O3 -march=corei7` on godbolt:

``````   // hand-tuned, not compiler output
mov       ecx, esi    ; ICC uses neg/add/mov :/
not       ecx
xor       eax, eax    ; breaks the false dep, or is the return value in the taken-branch case
shl       rdi, cl
jns    .bit_not_set
popcnt    rax, rdi
.bit_not_set:
ret
``````

That's pretty much optimal: The `A[pos] == true` case has one not-taken branch. It doesn't save very much over the branchless method, though.

If the `A[pos] == false` case is more common: jump over a `ret` instruction, to a `popcnt` / `ret`. (Or after inlining: jump to a block at the end that does the `popcnt` and jumps back).

• isn't `high_bits_to_eliminate & 63` redundant? Dec 22, 2015 at 12:02
• @GlennTeitelbaum: No, because the compiler doesn't know the range of `pos` is `[0..63]`. Try it without on godbolt, and see what happens to the asm. It tests and branches on `(uint64_t) pos > 63U`. It's similar to stackoverflow.com/questions/776508/…, where the masking in the source lines up with how the x86 instruction works, allowing the compiler to use it without checks or undefined behaviour. `std::bitset::operator<<` looks like it saturates the count, producing a zero result when you shift out all the bits. Dec 22, 2015 at 12:08
• Apparently ARM's shift instructions saturate the count, so you might get more efficient code on ARM from not masking. (But then calling the function with an out-of-range `pos` would cause Undefined Behaviour. blog.llvm.org/2011/05/what-every-c-programmer-should-know.html mentions shifts.) Dec 22, 2015 at 12:18
• What are your thoughts on changing `return A[63] ? A.count() : 0;` to `return A[63] * A.count();` given no expectation of predictability Dec 22, 2015 at 14:58
• @GlennTeitelbaum: Interesting, to my surprise that does actually make arguably better code with gcc for x86-64. `xor/test/cmov` is replaced with `shr imm/imul r32,r32`. `imul` is 1 uop, 3 cycle latency, so it's slightly worse for latency, slightly better for throughput. Both ways were branchless on x86-64, but only the mul version is branchless on ARM64 (not counting the function call to `popcount`). clang generates identical code either way, because it sees through the multiply by a 0 or 1 value. Dec 22, 2015 at 22:54

My immediate reaction would be to test the specified bit, and immediately return 0 of it's clear.

If you get past that, create a bit-mask with that bit (and the less-significant ones) set, and `and` that with the original input. Then use the `count()` member function to get the count of bits set in the result.

As for creating the mask: you can shift 1 left N places, then subtract 1.

• Hmmm, for 0: `(1<<0)-1==0` but I was looking for a 1 if it was set, this checks all bits below but not at. We could then just add 1. leaving `(bits[X]) ? bitset<64>((1UL << x) - 1)).count() +1 : 0` Dec 22, 2015 at 2:24
• @GlennTeitelbaum: I guess I should have been clear, but I was thinking in terms of 1-based bit-numbering, so for the least significant bit, it would be (1<<1)-1 = 1, exactly what you're looking for. The place you run into difficulty is if you want to count all bits, in which case you need a type that can hold at least one extra bit before the subtraction. Dec 22, 2015 at 4:09
• @JerryCoffin in the latter case you can just return the `count` of the original :) Dec 22, 2015 at 7:37
• @CompuChip: You can, but if possible I'd prefer to avoid there being any special cases. Dec 22, 2015 at 13:37
• `std::bitset` is 0 based, and I'm not sure how to get an extra bit from a `long long` Dec 22, 2015 at 15:02

Assuming an `unsigned long` or `unsigned long long` is big enough to hold 64 bits, you can call `bits.to_unlong()` (or `bits.to_ullong()`) to get the bitset data as an integer, mask off the bits above X (`(1 << X) - 1`) then count those bits as given in the answer to the question you link to.

It's easy to convert between a bit and a mask for bits below it, so something like this should work:

``````int popcnt(bitset<64> bs, int x) {
// Early out when bit not set
if (!bs[x]) return 0;
return (bs & bitset<64>((1UL << x) - 1)).count() + 1;
}
``````

The assumption here is that `bitset::count` is implemented efficiently (using `popcnt` intrinsics or an efficient fallback); this isn't guaranteed, but the STL folks tend to optimize this sort of thing.

• Not sure you can do a shift of 64 in a `long long` Dec 22, 2015 at 2:34
• @GlennTeitelbaum: Good point, moved to adding one and only masking lower bits off. Dec 22, 2015 at 2:42

I've edited a problem I've seen before which would check if an odd or even number of bits are set in a number. It's for C but it shouldn't be too hard to massage it into C++. The crux of the solution is what's in the while loop. Try it out on paper to understand how it picks out the LSB and then removes it from x. The rest of the code is straight forward. The code runs in O(n), where n is the number of set bits in x. That's much better than linear time which I had also thought was only possible when first looking at this problem.

``````#include <stdio.h>

int
count(long x, int pos)
{
/* if bit at location pos is not set, return 0 */
if (!((x >> pos) & 1))
{
return 0;
}

/* prepare x by removing set bits after position pos */
long tmp = x;
tmp = tmp >> (pos + 1);
tmp = tmp << (pos + 1);
x ^= tmp;

/* increment count every time the first set bit of x is removed (from the right) */
int y;
int count = 0;
while (x != 0)
{
y = x & ~(x - 1);
x ^= y;
count++;
}
return count;
}

int
main(void)
{
/* run tests */
long num = 0b1010111;
printf("%d\n", count(num, 0)); /* prints: 1 */
printf("%d\n", count(num, 1)); /* prints: 2 */
printf("%d\n", count(num, 2)); /* prints: 3 */
printf("%d\n", count(num, 3)); /* prints: 0 */
printf("%d\n", count(num, 4)); /* prints: 4 */
printf("%d\n", count(num, 5)); /* prints: 0 */
printf("%d\n", count(num, 6)); /* prints: 5 */
}
``````