# Help understanding how this recursive python function works?

i'm a a programmer, i do some C# perl and python, anyways, i found this recursive code to generate permutations, of a list of symbols and letters, but i can't figure out how it works? can anyone care to explain it please?

``````#!/usr/bin/env python
#-*- coding:utf-8 -*-

def generate(charlist,state,position):
for i in charlist:
state[position] = i
if position == (len(state)-1):
print "".join(state)
else:
generate(charlist,state,position+1)

generate("1234567890qwertyuiopasdfghjklzxcvbnm",[None]*8,0)
``````

here is the code, with all correct spacing.

-
You never return the function thus it isn't properly recursive. –  Jakob Bowyer Jul 14 '11 at 14:14
there we go, made sure it's perfect, code works as well. also edited title, to match what you said Jakob. –  TheEliteNoob Jul 14 '11 at 14:14
@Jakob Bowyer A recursive function is any function that calls itself. –  Joshua Dale Jul 14 '11 at 14:19
@Jakob, not necessarily true. A function only needs to call itself to be considered recursive. –  Manny D Jul 14 '11 at 14:21

This does not generate permutations. It generates n-dimensional cartesian products. (In the process, it also generates all permutations, but the algorithm to generate only permutations would be different.)

It's a bit difficult to explain how it works, but if you look at the output for small input, you can see what's going on. Consider the output for `'abc'` and `[None] * 3` (I modified the code to act as a true generator):

``````>>> def generate(charlist,state,position):
...     for i in charlist:
...         state[position] = i
...         if position == (len(state)-1):
...             yield "".join(state)
...         else:
...             for j in generate(charlist,state,position+1):
...                 yield j
...
>>> print list(generate('abc', [None] * 3, 0))
['aaa', 'aab', 'aac', 'aba', 'abb', 'abc', 'aca', 'acb', 'acc',
'baa', 'bab', 'bac', 'bba', 'bbb', 'bbc', 'bca', 'bcb', 'bcc',
'caa', 'cab', 'cac', 'cba', 'cbb', 'cbc', 'cca', 'ccb', 'ccc']
``````

As you can see, what happens is that initially, `generate` calls itself three times, incrementing `position` each time (from `0` to `1` to `2`). Each time through the recursion-loop, it puts `'a'` in the current position and tests to see if it has reached the end of the `state` list. If so, it yields the result and does not call itself.

In this case, when that happens, `position == 2`. Now the `for` loop kicks in, storing `'b'` and `'c'` in `state[2]` and yielding each of those states. Then the function ends, and control is returned to the caller, for which `position == 1`. The caller then continues through its for loop; it sets `state[1] = 'b'` and then, since `position` is no longer at the end of the `state` list, it calls itself again... now `position == 2` and the for loop sets `state[2] == 'a'`, `'b'`, `'c'`, and so on.

By the way, if you want to compute cartesian products in python, here's a nice way that doesn't require your readers to parse out a recursive algorithm:

``````>>> import itertools
>>> [''.join(c) for c in itertools.product('abc', 'abc', 'abc')]
['aaa', 'aab', 'aac', 'aba', 'abb', 'abc', 'aca', 'acb', 'acc',
'baa', 'bab', 'bac', 'bba', 'bbb', 'bbc', 'bca', 'bcb', 'bcc',
'caa', 'cab', 'cac', 'cba', 'cbb', 'cbc', 'cca', 'ccb', 'ccc']
``````

You could also do

``````>>> [''.join(c) for c in itertools.product(*['abc'] * 3)]
``````
-
thank you! this was very helpful! –  TheEliteNoob Jul 14 '11 at 14:29

You can't figure out how it works? Put this line just after the `def generate...`:

``````print charlist, state, position
``````

and it will tell you what variables are used at each call.

-
hmm, ok, i'll try that out. ok, that was kind of useful, but i'm trying to figure out why it works, and what each line does. –  TheEliteNoob Jul 14 '11 at 14:22

The function outputs every possible (unless the third argument is non-zero) combination of given characters.

It takes as the input:

1. a list or string of characters that will be combined,
2. a list which length denotes how many characters should be combined at once,
3. a number which denotes how many characters of each combination should be replaced with corresponding characters from the second list (which will reduce the number of possible combinations accordingly).

If the second argument is a list of 8 `None` values (because `[None] * 8 == [None, None, None, None, None, None, None, None]`), setting third argument to non-zero value will cause `TypeError`.

@senderle's answer explains what happens in the function.

I should say that this is an example of non-Pythonic code, precisely because it's hard to tell its purpose from the first sight.

-