# Number of simple mutations to change one string to another?

I'm sure you've all heard of the "Word game", where you try to change one word to another by changing one letter at a time, and only going through valid English words. I'm trying to implement an A* Algorithm to solve it (just to flesh out my understanding of A*) and one of the things that is needed is a minimum-distance heuristic.

That is, the minimum number of one of these three mutations that can turn an arbitrary string a into another string b: 1) Change one letter for another 2) Add one letter at a spot before or after any letter 3) Remove any letter

Examples

``````aabca => abaca:
aabca
abca
abaca
= 2

abcdebf => bgabf:
abcdebf
bcdebf
bcdbf
bgdbf
bgabf
= 4
``````

I've tried many algorithms out; I can't seem to find one that gives the actual answer every time. In fact, sometimes I'm not sure if even my human reasoning is finding the best answer.

Does anyone know any algorithm for such purpose? Or maybe can help me find one?

(Just to clarify, I'm asking for an algorithm that can turn any arbitrary string to any other, disregarding their English validity-ness.)

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If you don't actually care about the inbetween steps being actual english words, which it seems you don't judging by the comment you left below, you should mention that in your question, since you're description of the original word game seems to indicate you do care. –  Lasse V. Karlsen May 15 '10 at 21:14
Sorry; I thought I was changing the terms of my question when I said "any arbitrary string", and then gave examples with strings that weren't words. But I think the context is a bit misleading, so I'll make it more clear. Thanks =) –  Justin L. May 17 '10 at 4:35
The first paragraph of the question is completely misleading! Also this has to be a dupe. –  Aryabhatta May 17 '10 at 4:44

You want the minimum edit distance (or Levenshtein distance):

The Levenshtein distance between two strings is defined as the minimum number of edits needed to transform one string into the other, with the allowable edit operations being insertion, deletion, or substitution of a single character. It is named after Vladimir Levenshtein, who considered this distance in 1965.

And one algorithm to determine the editing sequence is on the same page here.

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that may not apply since he is using english-only words. –  Bill K May 13 '10 at 23:43
actually, this is exactly what I'm looking for; I'm looking for a shortest-distance heuristic that doesn't bother with the dictionary. Thanks =) –  Justin L. May 14 '10 at 7:10
Bear in mind that if you're trying to find the shortest path via valid words, the levenstein distance only provides a lower bound. The option that has the lowest levenstein distance could actually be further from the destination than one with a higher distance. –  Nick Johnson May 16 '10 at 0:58
I'm trying to implement an A* pathfinding algorithm to find the shortest path; the implementation requires a lower-bound heuristic to assist in calculations. –  Justin L. May 20 '10 at 9:18

An excellent reference on "Edit distance" is section 6.3 of the Algorithms textbook by S. Dasgupta, C. H. Papadimitriou, and U. V. Vazirani, a draft of which is available freely here.

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thanks for the link to the text book; it will come quite in handy =) –  Justin L. Jun 9 '10 at 4:53