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):
add, delete = previous[j]+6, current[j-1]+8
change = previous[j-1]
if a[j-1] != b[i-1]:
change=change+8
current[j] = min(add, delete, change)
tuples.append(current)
return current[n]
print levenshtein('calculate','late')
```

`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`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