# Lowest cost to convert one string to another

Suppose we want to convert one string S1 to another string S2 using only 3 types of operations:

``````-Insert(pos,char) (costs 8)
-Delete(pos) (costs 6)
-Replace(pos,char) (costs 8)
``````

Find the sequence of steps to convert S1 to S2 such that the cost to convert S1 to S2 is minimum. Eg. 'calculate' to 'late' - the possible operations are

``````Delete(0)
Delete(1)
Delete(2)
Delete(3)
Delete(4)
``````

and the above sequence of operations costs 30.

I am using the following code to do this but its not giving correct results. The algorithm used is Levenshtein.

``````tuples=[]
ops=[]
s1=''
s2=''
def levenshtein(a,b):
global s1,s2
n, m = len(a), len(b)
if n > m:
a,b = b,a
n,m = m,n
s1,s2=a,b
current = range(n+1)
for i in range(0,len(current)):
current[i]=current[i]*8
tuples.append(current)
for i in range(1,m+1):
previous, current = current, [i*8]+[0]*n
for j in range(1,n+1):
change = previous[j-1]
if a[j-1] != b[i-1]:
change=change+8
tuples.append(current)
return current[n]
print levenshtein('calculate','late')
``````
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What do you think? Post your solution and we'll discuss it. –  Maroun Maroun Apr 23 '13 at 7:02
How can I add code here? –  user1471283 Apr 23 '13 at 7:06
@user1471283 Click on `edit` and insert the code. Make sure you put four space characters in front of every code line to get the formatting right. And please reduce the code to the relevant minimum. –  jogojapan Apr 23 '13 at 7:07
Also note that the 5 operations you list will not produce "late" from "calculate", but will produce "aclt". You need to either delete 4,3,2,1,0 or 0,0,0,0,0. –  Lee Daniel Crocker Apr 23 '13 at 7:09
There are at least two errors in the code: 1) First line in the `i`-loop should calculate the cost as `[i*6]+[0]*n`, i.e. `6` instead of `8` because it reflects deletion. 2) First line in the `j`-loop should start with `delete,add` instead of `add,delete`, because the left element of the tuple is in fact the cost for deletion, the right element is that for insertion. –  jogojapan Apr 23 '13 at 7:22

You can use the Levenshtein Distance algorithm

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I used Levenshtein Distance, but didn't get correct result. –  user1471283 Apr 23 '13 at 7:04
@user1471283 Then your implementation is wrong. –  dejavu Apr 23 '13 at 7:05
Then you're not using it right. That's why you should post your solution. –  Maroun Maroun Apr 23 '13 at 7:05
@user1471283 Have you adjusted the cost function of your implementation? The default is a cost of 1 for all three operations, but your cost is 8, 6, 8, respectively. –  jogojapan Apr 23 '13 at 7:06
Yes I did adjust the cost function. –  user1471283 Apr 23 '13 at 7:07

I would solve this problem using dynamic programming. Use a two dimensional array `mem[n1][n2]` where `mem[i][j]` stores the minimum cost to convert the suffix of first string starting from position `i` to the suffix of the second string starting at `j`.

Your approach seems greedy and also I think it will be extremely slow for bigger examples.

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I am using dynamic programming and storing the minimum cost to convert the suffix of first string starting from position i to the suffix of the second string starting at j. –  user1471283 Apr 23 '13 at 8:27
@user1471283 you will have to add a way more detailed explanation to your algorithm then. I don't seem to quite understand what you are doing it seems. –  Ivaylo Strandjev Apr 23 '13 at 8:30