# Understanding and visualizing recursion

I referred to several questions here about recursion but I am not able to understand how recursion works for this particular problem: Recursive program to get all combination of characters in a string in Python:

``````st= []
def combi(prefix, s):
if len(s)==0: return
else:
st.append(prefix+s[0])

''' printing values so that I can see what happens at each stage '''
print "s[0]=",s[0]
print "s[1:]=",s[1:]
print "prefix=",prefix
print "prefix+s[0]=",prefix+s[0]
print "st=",st

combi(prefix+s[0],s[1:])
combi(prefix,s[1:])
return st

print combi("",'abc')
``````

I've made it print the values so that I can see what's happening. This is the output:

``````s[0]= a
s[1:]= bc
prefix=
prefix+s[0]= a
st= ['a']
s[0]= b
s[1:]= c
prefix= a
prefix+s[0]= ab
st= ['a', 'ab']
s[0]= c
s[1:]=
prefix= ab
prefix+s[0]= abc
st= ['a', 'ab', 'abc']
s[0]= c
s[1:]=
prefix= a  ----> How did prefix become 'a' here. Shouldn't it be 'abc' ?
prefix+s[0]= ac
st= ['a', 'ab', 'abc', 'ac']
.........
.........
['a', 'ab', 'abc', 'ac', 'b', 'bc', 'c'] # final output
``````

Full output: http://pastebin.com/Lg3pLGtP

As I've shown in the output, how did prefix become 'ab'?

I tried to visualize the recursive calls for the combi(prefix+s[0],s[1:]). Am I understanding it right?

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There are two recursive calls to `combi()` in the function. Thus the path of calls is not a single line, but rather a binary tree that forks. What you are seeing is the second half of the tree.

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I thought the 2nd recursive call i.e `combi(prefix,s[1:])` would start off as `combi('','bc')` and go though the same process forming b,bc. Here at the last step s[0] is 'c' and when recursing out prefix+s[0] becomes ''+c = c if I understand it right? Btw, I've added a pastbin link of the complete output to the question. –  Bharat Feb 7 '12 at 3:48
If you're familiar with depth-first search, it's how the tree Amber mentions is being traversed (or generated, depending on how you want to look at it). –  ktodisco Feb 7 '12 at 3:56
@RBK: It's the call for `combi('a', 'c')` from `combi('a','bc')` that's creating the second `prefix='a'`. –  Amber Feb 7 '12 at 3:59
@ktodisco , Yes I know Depth first traversal. I think the connection with recursion in general would be that DFS uses a stack.. I will try to visualize it on paper & see... I am still not able to understand how the backtracking works exactly. –  Bharat Feb 7 '12 at 4:05
@Amber, `prefix+s[0]` is passed as the 1st argument to combi, doesn't prefix now become 'ab' after the call to `combi('a','bc')` ? How does it remain 'a' ? –  Bharat Feb 7 '12 at 4:11

Theres a python module for that

Generated with:

``````from rcviz import callgraph, viz
st= []
@viz
def combi(prefix, s):
if len(s)==0:
return
else:
st.append(prefix+s[0])
combi.track(st = st) #track st in rcviz
combi(prefix+s[0],s[1:])
combi(prefix,s[1:])
return st

print combi("",'abc')
callgraph.render("combi.png")
``````
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Thanks. Looks interesting. I'll try it out. –  Bharat May 25 '14 at 4:08
This library is very useful. Thanks. Up voted. –  Bharat May 27 '14 at 16:21

I drew the recursion tree. By Depth First Traversal, the final output is got at the last node. This visualization helps understand what's happening.

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