# scanning binary sequences of length n with k 1's and n-k 0's

I want to write a loop that scans all binary sequences of length n with k 1's and n-k 0's.

Actually, in each iteration an action is performed on the sequence and if a criterion is met the loop will break, otherwise it goes to next sequence. (I am not looking for `nchoosek` or `perms` since for large values of n it takes so much time to give the output).

What MATLAB code do you suggest?

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Wasn't this same question asked yesterday? Seems to be removed now, I believe there were at least some helpful comments there. – Bas Swinckels Sep 24 '13 at 6:13
so do all zeros follow all ones (vice-a-versa)? – Parag S. Chandakkar Sep 24 '13 at 6:19
@Parag No! All combination of such sequences without any exception. – Mahdi Khosravi Sep 24 '13 at 6:24
@BasSwinckels: +1 there were good suggestions indeed: using `std::next_permutation` in C++, and Gosper's Bit Twiddling Hack – Amro Sep 24 '13 at 7:21
@MahdiKhosravi you got C++ answers last time because you tagged it C++. – harold Sep 24 '13 at 7:29

You could implement something like an iterator/generator pattern:

``````classdef Iterator < handle
properties (SetAccess = private)
n              % sequence length
counter        % keeps track of current iteration
end

methods
function obj = Iterator(n)
% constructor
obj.n = n;
obj.counter = 0;
end

function seq = next(obj)
% get next bit sequence
if (obj.counter > 2^(obj.n) - 1)
error('Iterator:StopIteration', 'Stop iteration')
end
seq = dec2bin(obj.counter, obj.n) - '0';
obj.counter = obj.counter + 1;
end

function tf = hasNext(obj)
% check if sequence still not ended
tf = (obj.counter <= 2^(obj.n) - 1);
end

function reset(obj)
% reset the iterator
obj.counter = 0;
end
end
end
``````

Now you can use it as:

``````k = 2;
iter = Iterator(4);
while iter.hasNext()
seq = iter.next();
if sum(seq)~=k, continue, end
disp(seq)
end
``````

In the example above, this will iterate through all 0/1 sequences of length 4 with exactly k=2 ones:

`````` 0     0     1     1
0     1     0     1
0     1     1     0
1     0     0     1
1     0     1     0
1     1     0     0
``````
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Thank you very much. It seems nice. For the case I'm facing I must skip the cases where the number of 1's is not the desired k? Or there is a better solution? – Mahdi Khosravi Sep 24 '13 at 7:09
you could add a test to the loop: `if sum(seq)~=k, continue, end` – Amro Sep 24 '13 at 7:12
Thanks! Nice answer. – Mahdi Khosravi Sep 24 '13 at 7:15
I'm sure there are more efficient ways: stackoverflow.com/q/1851134/97160 – Amro Sep 24 '13 at 7:16
Is there any way to make it faster? Unfortunately, `nchoosek` works much faster – Mahdi Khosravi Sep 24 '13 at 7:41