What would be a better implementation of all combinations in lexicographic order of a jagged list?

I was put in a position today in which I needed to enumerate all possible combinations of jagged list. For instance, a naive approach would be:

``````for a in [1,2,3]:
for b in [4,5,6,7,8,9]:
for c in [1,2]:
yield (a,b,c)
``````

This is functional, but not general in terms of the number of lists that can be used. Here is a more generalized approach:

``````from numpy import zeros, array, nonzero, max

make_subset = lambda x,y: [x[i][j] for i,j in enumerate(y)]

def combinations(items):
num_items = [len(i) - 1 for i in items]
state = zeros(len(items), dtype=int)
finished = array(num_items, dtype=int)
yield grab_items(items, state)
while True:
if state[-1] != num_items[-1]:
state[-1] += 1
yield make_subset(items, state)
else:
incrementable = nonzero(state != finished)[0]
if not len(incrementable):
raise StopIteration
rightmost = max(incrementable)
state[rightmost] += 1
state[rightmost+1:] = 0
yield make_subset(items, state)
``````

Any recommendations on a better approach or reasons against the above approach?

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This question looks similar: stackoverflow.com/questions/215908/… –  Brian Oct 22 '08 at 1:39

The naive approach can be written more compactly as a generator expression:

``````((a,b,c) for a in [1,2,3] for b in [4,5,6,7,8,9] for c in [1,2])
``````

The general approach can be written much more simply using a recursive function:

``````def combinations(*seqs):
if not seqs: return (item for item in ())
first, rest = seqs[0], seqs[1:]
if not rest: return ((item,) for item in first)
return ((item,) + items for item in first for items in combinations(*rest))
``````

Sample usage:

``````>>> for pair in combinations('abc', [1,2,3]):
...   print pair
...
('a', 1)
('a', 2)
('a', 3)
('b', 1)
('b', 2)
('b', 3)
('c', 1)
('c', 2)
('c', 3)
``````
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That's pretty slick –  daniel Oct 22 '08 at 2:22
Nice (Parenthetically I am getting to and exceeding the minimum number of characters for a valid comment.) –  unmounted Oct 22 '08 at 8:33