Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

What is the best way to find all of the combinations of 2 lists where the values in 1 list can repeat and in the other list they cannot repeat? Right now, I can get all of the combinations of the repeating list as in:

import itertools
rep = ['A','B','C', 'D']
norep = ['1','2','3','4']
for i in itertools.combinations_with_replacement(rep,4):
    print i

I can get all of the combinations of the non-repeating list:

for i in itertool.combinations(norep,4):
    print i

and I can get the combinations of the two lists as if they are both non-repeating:

for i in itertools.product([0, 1], repeat=4):
    print [(norep[j] if i else rep[j]) for j, i in enumerate(i)]

However, I can't figure out how to get the combinations of the repeating and the non repeating list. I'd also like to add in the combinations including null values, e.g.['A','1',Null].

share|improve this question
1  
Should each combination draw a fixed number n values from the first list and m from the second, with and without repetition respectively? Or do you want to draw a n values from a combined pool, allowing repetitions of elements from one list, but not from the other? –  user2357112 Jul 19 '13 at 0:39
    
Note: Your "combinations of the two lists as if they are both non-repeating" code doesn't work. It'll never draw the first 2 elements from both lists. –  user2357112 Jul 19 '13 at 0:43
    
@user2357112 Thanks for checking that. I didn't notice my combinations of the two lists didn't yield all of the combinations. In your 1st post, I want the latter behavior. I would like to specify the amount of values in a combination,e.g. n=4 gives [A,B,1,2],etc or n=5 gives [A,C,1,3,null], etc. –  chunky Jul 19 '13 at 1:13
    
Do you want to allow multiple Nones? (And would you prefer a tuple with Nones in it, or just a shorter tuple?) –  user2357112 Jul 19 '13 at 1:17
    
@user2357112 I want to allow multiple 'None's and would like them to be in the tuple. I thought about adding them in 'rep' and 'norep' but wasn't sure if that would give the desired behavior. –  chunky Jul 19 '13 at 1:24

2 Answers 2

up vote 1 down vote accepted

This is what I got. Pretty close to yours:

from itertools import chain
from itertools import combinations
# Huge name!
from itertools import combinations_with_replacement as cwr
from itertools import starmap
from itertools import product

from operator import add

def _weird_combinations(rep, no_rep, n_from_rep, n_from_norep):
    return starmap(add, product(cwr(rep, n_from_rep),
                                combinations(no_rep, n_from_norep)))

def weird_combinations(rep, no_rep, n):
    rep, no_rep = list(rep), list(no_rep)

    # Allow Nones in the output to represent drawing less than n elements.
    # If either input has None in it, this will be confusing.
    rep.append(None)

    # We can't draw more elements from no_rep than it has.
    # However, we can draw as many from rep as we want.
    least_from_rep = max(0, n-len(no_rep))
    return chain.from_iterable(
            _weird_combinations(rep, no_rep, n_from_rep, n-n_from_rep)
            for n_from_rep in xrange(least_from_rep, n+1))
share|improve this answer

I think I've come up with a solution, but please correct me if this wrong. I would also love to see if there are any more elegant solutions.

First, I came up with the total number of combinations. All combinations without replacement are equal to n!/r!(n-r)! and with replacement are equal to (m+s-1)!/s!(m-1)! where m and n are number of items to choose from and r and s are the number of items you actually choose. Because I know the total items I want in each combination (lets call it cap), I find the number of combinations for 0 of the no replacement type (n=0) and for "cap" of the replacement type (m=3) and multiply those numbers together. Then, add to that the number of combinations for 1 of the no replacement type (n=1) multiplied by combinations "cap-1" of the replacement type (m=2). Do this until you have finally added combinations for "cap" of the no replacement type (n=3) multiplied by 0 of the replacement type (m=0) (thanks @André Nicolas). The code for number of combinations is below.

import itertools
from math import factorial as fact
norep = ['A','B','C']
rep = ['1','2','3']

cap = 3     #length of combinations, e.g. cap=3, combo1=123,combo2=A12,etc
combos = 0

for i in range(cap+1):
    combnorep = fact(len(norep))/(fact(cap-i)*fact(len(norep)-(cap-i)))
    combrep = fact(len(rep)+i-1)/(fact(i)*fact(len(rep)-1))
    combos = combos + combnorep*combrep
print combos

For this example, the number of combos is 38. Next, I wanted to print all of the combinations. To do this, I determined the combinations for all replacements, all no replacements, and any combination of the two,e.g. n=0,m=3;n=1,m=2;etc. This is what I came up with:

for i in range(cap+1):
    norepcomb = [j for j in itertools.combinations(norep,i)]
    repcomb = [k for k in itertools.combinations_with_replacement(rep,cap-i)]
    for l in itertools.product(norepcomb,repcomb):
        print list(itertools.chain.from_iterable(l))

To include none, I would just include none in my list for with replacement combinations. I'd like any feedback on this especially if there is a better solution or if this doesn't work like I think it does. Thanks!

share|improve this answer
    
That's pretty close to what I was doing before I got bored and played some video games instead. You don't need some of those list comprehensions, and my code produced a different output format. I think I still have the tab with my work open. –  user2357112 Jul 21 '13 at 23:24

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.