# all combination of a complicated list

I want to find all possible combination of the following list:

``````data = ['a','b','c','d']
``````

I know it looks a straightforward task and it can be achieved by something like the following code:

``````comb = [c for i in range(1, len(data)+1) for c in combinations(data, i)]
``````

but what I want is actually a way to give each element of the list data two possibilities (`'a'` or `'-a'`).

An example of the combinations can be `['a','b']` , `['-a','b']`, `['a','b','-c']`, etc. without something like the following case of course `['-a','a']`.

You could write a generator function that takes a sequence and yields each possible combination of negations. Like this:

``````import itertools
def negations(seq):
for prefixes in itertools.product(["", "-"], repeat=len(seq)):
yield [prefix + value for prefix, value in zip(prefixes, seq)]

print list(negations(["a", "b", "c"]))
``````

Result (whitespace modified for clarity):

``````[
[ 'a',  'b',  'c'],
[ 'a',  'b', '-c'],
[ 'a', '-b',  'c'],
[ 'a', '-b', '-c'],
['-a',  'b',  'c'],
['-a',  'b', '-c'],
['-a', '-b',  'c'],
['-a', '-b', '-c']
]
``````

You can integrate this into your existing code with something like

``````comb = [x for i in range(1, len(data)+1) for c in combinations(data, i) for x in negations(c)]
``````

Once you have the regular combinations generated, you can do a second pass to generate the ones with "negation." I'd think of it like a binary number, with the number of elements in your list being the number of bits. Count from 0b0000 to 0b1111 via 0b0001, 0b0010, etc., and wherever a bit is set, negate that element in the result. This will produce 2^n combinations for each input combination of length n.

Here is one-liner, but it can be hard to follow:

``````from itertools import product

comb = [sum(t, []) for t in product(*[([x], ['-' + x], []) for x in data])]
``````

First map `data` to lists of what they can become in results. Then take `product*` to get all possibilities. Finally, flatten each combination with `sum`.

My solution basically has the same idea as John Zwinck's answer. After you have produced the list of all combinations

``````comb = [c for i in range(1, len(data)+1) for c in combinations(data, i)]
``````

you generate all possible positive/negative combinations for each element of `comb`. I do this by iterating though the total number of combinations, `2**(N-1)`, and treating it as a binary number, where each binary digit stands for the sign of one element. (E.g. a two-element list would have 4 possible combinations, 0 to 3, represented by `0b00 => (+,+)`, `0b01 => (-,+)`, `0b10 => (+,-)` and `0b11 => (-,-)`.)

``````def twocombinations(it):
sign = lambda c, i: "-" if c & 2**i else ""
l = list(it)

if len(l) < 1:
return

# for each possible combination, make a tuple with the appropriate
# sign before each element
for c in range(2**(len(l) - 1)):
yield tuple(sign(c, i) + el for i, el in enumerate(l))
``````

Now we apply this function to every element of `comb` and flatten the resulting nested iterator:

``````l = itertools.chain.from_iterable(map(twocombinations, comb))
``````