Here is an example to show @Shai's idea of using a lookup table:
% build lookup table for 8-bit integers
lut = sum(dec2bin(0:255)-'0', 2);
% get indices
idx = find(mlf);
% break indices into 8-bit integers and apply LUT
nbits = lut(double(typecast(uint32(idx),'uint8')) + 1);
% sum number of bits in each
s = sum(reshape(nbits,4,[]))
you might have to switch to uint64
instead if you have really large sparse arrays with large indices outside the 32-bit range..
EDIT:
Here is another solution for you using Java:
idx = find(mlf);
s = arrayfun(@java.lang.Integer.bitCount, idx);
EDIT#2:
Here is yet another solution implemented as C++ MEX function. It relies on std::bitset::count
:
bitset_count.cpp
#include "mex.h"
#include <bitset>
void mexFunction(int nlhs, mxArray *plhs[], int nrhs, const mxArray *prhs[])
{
// validate input/output arguments
if (nrhs != 1) {
mexErrMsgTxt("One input argument required.");
}
if (!mxIsUint32(prhs[0]) || mxIsComplex(prhs[0]) || mxIsSparse(prhs[0])) {
mexErrMsgTxt("Input must be a 32-bit integer dense matrix.");
}
if (nlhs > 1) {
mexErrMsgTxt("Too many output arguments.");
}
// create output array
mwSize N = mxGetNumberOfElements(prhs[0]);
plhs[0] = mxCreateDoubleMatrix(N, 1, mxREAL);
// get pointers to data
double *counts = mxGetPr(plhs[0]);
uint32_T *idx = reinterpret_cast<uint32_T*>(mxGetData(prhs[0]));
// count bits set for each 32-bit integer number
for(mwSize i=0; i<N; i++) {
std::bitset<32> bs(idx[i]);
counts[i] = bs.count();
}
}
Compile the above function as mex -largeArrayDims bitset_count.cpp
, then run it as usual:
idx = find(mlf);
s = bitset_count(uint32(idx))
I decided to compare all the solutions mentioned so far:
function [t,v] = testBitsetCount()
% random data (uint32 vector)
x = randi(intmax('uint32'), [1e5,1], 'uint32');
% build lookup table (done once)
LUT = sum(dec2bin(0:255,8)-'0', 2);
% functions to compare
f = {
@() bit_twiddling(x) % bit twiddling method
@() lookup_table(x,LUT); % lookup table method
@() bitset_count(x); % MEX-function (std::bitset::count)
@() dec_to_bin(x); % dec2bin
@() java_bitcount(x); % Java Integer.bitCount
};
% compare timings and check results are valid
t = cellfun(@timeit, f, 'UniformOutput',true);
v = cellfun(@feval, f, 'UniformOutput',false);
assert(isequal(v{:}));
end
function s = lookup_table(x,LUT)
s = sum(reshape(LUT(double(typecast(x,'uint8'))+1),4,[]))';
end
function s = dec_to_bin(x)
s = sum(dec2bin(x,32)-'0', 2);
end
function s = java_bitcount(x)
s = arrayfun(@java.lang.Integer.bitCount, x);
end
function s = bit_twiddling(x)
p1 = uint32(1431655765);
p2 = uint32(858993459);
p3 = uint32(252645135);
p4 = uint32(16711935);
p5 = uint32(65535);
s = x;
s = bitand(bitshift(s, -1), p1) + bitand(s, p1);
s = bitand(bitshift(s, -2), p2) + bitand(s, p2);
s = bitand(bitshift(s, -4), p3) + bitand(s, p3);
s = bitand(bitshift(s, -8), p4) + bitand(s, p4);
s = bitand(bitshift(s,-16), p5) + bitand(s, p5);
end
The times elapsed in seconds:
t =
0.0009 % bit twiddling method
0.0087 % lookup table method
0.0134 % C++ std::bitset::count
0.1946 % MATLAB dec2bin
0.2343 % Java Integer.bitCount
sum
does exactly what you want.dec2bin
as the above example in the q. There may be some fast way with modulo to achieve my goal of getting the number of active vars.