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
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
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?