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]+*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')