# Algorithm for measuring distance between disordered sequences

The Levenshtein distance gives us a way to calculate the distance between two similar strings in terms of disordered individual characters:

```quick brown fox
quikc brown fax
```

The Levenshtein distance = 3.

What is a similar algorithm for the distance between two strings with similar subsequences? For example, in

```quickbrownfox
brownquickfox
```

the Levenshtein distance is 10, but this takes no account of the fact that the strings have two similar subsequences, which makes them more "similar" than completely disordered words like

```quickbrownfox
qburiocwknfox
```

and yet this completely disordered version has a Levenshtein distance of eight.

What distance measures exist which take the length of subsequences into account, without assuming that the subsequences can be easily broken into distinct words?

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How is this off-topic? Maybe one could just improve the title. – Dario May 18 '10 at 11:26
Was asked many times under better name :o) stackoverflow.com/questions/451884/similar-string-algorithm or stackoverflow.com/questions/653157/… or stackoverflow.com/questions/246961/… Btw: I especially like the idea with compression based distance. – MaR May 18 '10 at 11:27
@Dario: What title would you suggest? – user181548 May 18 '10 at 11:28
@MaR: those questions are not the same as this question. The point is that there is no obvious way to break the string into words. – user181548 May 18 '10 at 11:30
Also interesting page comparing different string similarity metrics: dcs.shef.ac.uk/~sam/stringmetrics.html Best seems to be SmithWatermanGotoh metric in this comparison. – MaR May 18 '10 at 11:32

I think that you can try shingles or some combinations of them with Levenshtein distance.

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Initial stab: use a diff algorithm and the count of the number of differences as your distance

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I have an impression that it's NP-complete problem.

At least, I cannot see how can we avoid an exhaustive search. Moreover, I cannot even see how can we verify given solution in polynomial time.

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One simple metric would be to take all n*(n-1)/2 substrings in each string, and see how many overlap. There are some simple variations to this approach where you only look at substrings up to a certain length.

This would be similar to the BLEU score commonly used to evaluate machine translations. In the case of BLEU, they are comparing two sentences: they take all the unigrams, bigrams, trigrams, and 4-grams of words from each sentence. They calculate a version of precision and recall for each, and essentially use an average of those scores.

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well the problem you're referring to falls under context sensitive grammar. You basically define a grammar, the english grammar in this case and then find the distance between a grammar and a mismatch. You'll need to parse your input first.

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It's not the English grammar. These are not English words. – user181548 May 19 '10 at 8:44