# What is a good way to iterate a number through all the possible values of a mask?

Given a bitmask where the set bits describe where another number can be one or zero and the unset bits must be zero in that number. What's a good way to iterate through all its possible values?

For example:

``````000 returns [000]
001 returns [000, 001]
010 returns [000, 010]
011 returns [000, 001, 010, 011]
100 returns [000, 100]
101 returns [000, 001, 100, 101]
110 returns [000, 010, 100, 110]
111 returns [000, 001, 010, 011, 100, 101, 110, 111]
``````

The simplest way to do it would be to do it like this:

``````void f (int m) {
int i;
for (i = 0; i <= m; i++) {
if (i == i & m)
printf("%d\n", i);
}
}
``````

But this iterates through too many numbers. It should be on the order of 32 not 2**32.

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It was maybe a good idea to ask this question again (as the other one is not likely to be reopened), but you should consider to delete the old question then. –  Christian Rau Sep 1 '11 at 23:03
@Jake: Should it be: 000 returns [000] ? –  Jiri Sep 1 '11 at 23:08
Might it not be worth writin it the brute force way and seeing if it's a speed problem? Or have you already tried that? Any algorithm you come up with is going to perform more slowly than brute force on input mask of `~0`, and possibly for other most-bits-set masks. What kind of masks are you generally going to be expecting? –  Chris Lutz Sep 1 '11 at 23:37
It came up while trying to write a program that converts an IP bitmask into a set of ranges. Each part of the mask is only 8 bits long and wouldn't be much of a problem iterating through all of them, but the question is for a more general problem not about what would work in that situation. –  Jake Sep 1 '11 at 23:43

There's a bit-twiddling trick for this (it's described in detail in Knuth's "The Art of Computer Programming" volume 4A §7.1.3; see p.150):

Given a mask `mask` and the current combination `bits`, you can generate the next combination with

``````bits = (bits - mask) & mask
``````

...start at 0 and keep going until you get back to 0. (Use an unsigned integer type for portability; this won't work properly with signed integers on non-two's-complement machines. An unsigned integer is a better choice for a value being treated as a set of bits anyway.)

Example in C:

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

{
unsigned int bits = 0;

do {
printf(" %u", bits);
} while (bits != 0);
printf("\n");
}

int main(void)
{
unsigned int n;

for (n = 0; n < 8; n++)
test(n);
return 0;
}
``````

which gives:

``````Testing 0: 0
Testing 1: 0 1
Testing 2: 0 2
Testing 3: 0 1 2 3
Testing 4: 0 4
Testing 5: 0 1 4 5
Testing 6: 0 2 4 6
Testing 7: 0 1 2 3 4 5 6 7
``````

(...and I agree that the answer for `000` should be `[000]`!)

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EDIT: Nevermind, your code uses `unsigned int`. +1. You should note the change from the OP's use of `int` to your use of `unsigned int`, though. It's probably important to this bit trick working portably. –  Chris Lutz Sep 1 '11 at 23:43
Whoah! Thanks, I got to work with this before I fully understand it. –  Jake Sep 1 '11 at 23:47
@Chris: good point; edited accordingly. Thanks. –  Matthew Slattery Sep 2 '11 at 0:31
I was trying so hard to come up with this, now after the fact its so obvious. Although I like it phrased as `n + ~m + 1 & m` since adding anything to the inverse causes the carry bit to "go over" the zero bits in the mask. –  Jake Sep 2 '11 at 5:54
@Matthew: I cannot not find the mentioned reference to this trick in Knuth: "The Art of Computer Programming" volume 4, Fascicle 1, §7.1.3; p.150. This page describes the solution of Ex. 10 and it does not seem to be related to the problem. Could you give me a hint, please? –  Jiri Sep 21 '11 at 19:30
show 1 more comment

First of all, it's unclear why 000 wouldn't return [000]. Is that a mistake?

Otherwise, given a mask value "m" and number "n" which meets the criterion (n & ~m)==0, I would suggest writing a formula to compute the next higher number. One such formula uses the operators "and", "or", "not", and "+", once each.

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Looks like a riddle! –  Kos Sep 1 '11 at 23:11
I suppose it should, fixed it in the above post. –  Jake Sep 1 '11 at 23:26

The trick by @Matthew is amazing. Here is a less tricky, but unfortunately also a less efficient, recursive version in Python:

``````def f(mask):
return ['0']
return ['0', '1']
else:
bits2 = []
for b in bits1:
bits2.append('0' + b)
bits2.append('1' + b)
return bits2

print f("101")  ===> ['000', '100', '001', '101']
``````
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You can do it brute-force. ;-) Ruby example:

``````require 'set'
set = Set.new
(0..n).each do |x|
set << (x & n)
end
``````

(where `set` is a set datatype, i.e., removes duplicates.)

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Try this code:

``````def f (máscara):
se máscara == "0":
voltar ['0 ']
elif máscara == '1 ':
voltar ['0 ', '1']
else:
bits1 = f (máscara [1:])
bits2 = []
para b em bits1:
bits2.append ('0 '+ b)
se máscara [0] == '1 ':
bits2.append ('1 '+ b)
voltar bits2

print f ("101") ===> ['000 ', '100', '001 ', '101']
``````

é interessante .

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