# Python backtracking strings lenght n from alphabet {a,b,c} with #a=#b

i want to make an algoritm that finds for a given n the strings made on the alphabet {a,b,c} in which the number 'a' appears the same times of 'b'

i came out with this

``````n=3 #length String
h=-1 #length prefix
L=['a','b','c'] #alphabet
S=['','','',''] #solution
par=0 # it's zero if a and b have same occurence

def P(n,h,par,L,S):
if h==n:
if par==0:
print(S)
else:
for i in L:
if i=='a':
par+=1
if i=='b':
par-=1
S[h+1]=i
P(n,h+1,par,L,S)
#Update the stack after recursion
if S[h+1]=='a':
par-=1
if S[h+1]=='b':
par+=1

P(n,h,par,L,S)
``````

i apologize for the poor string implementation but it works and it's only for studying purpose, the question is: there are ways to avoid some work for the algorithm? because it only checks #a and #b in the end after have generate all n-length strings for this alphabet. my goal is to achieve O(n*(number of strings to print))

-

You can cut out the wasted work by changing the following:

``````        if i=='a':
par+=1
if i=='b':
par-=1
``````

to

``````        oldpar = par
if i=='a':
par+=1
if i=='b':
par-=1
# there are n-h-1 characters left to place
# and we need to place at least abs(par) characters to reach par=0
if abs(par)>n-h-1:
par = oldpar
continue
``````
-
Thanks, this is helpfull, much appreciate – Hank000 Feb 18 '14 at 14:00

Is this what you're trying to do:

``````from itertools import combinations_with_replacement

alphabet = "abc"

def combs(alphabet, r):
for comb in combinations_with_replacement(alphabet, r):
if comb.count('a') == comb.count('b'):
yield comb
``````

For this,

``````list(combs(alphabet, 3)) == [('a', 'b', 'c'), ('c', 'c', 'c')]
``````

and

``````list(combs(alphabet, 4)) == [('a', 'a', 'b', 'b'),
('a', 'b', 'c', 'c'),
('c', 'c', 'c', 'c')]
``````

This will produce all combinations and reject some; according to the docs for `combinations_with_replacement`:

The number of items returned is `(n+r-1)! / r! / (n-1)!` when `n > 0`.

where `n == len(alphabet)`.

-
Thanks, i'll have to learn these tools. – Hank000 Feb 18 '14 at 13:55