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I'm trying to figure out an algorithm that gives a measure of similarity between two lists, each having n distinct elements. The two lists are basically different arrangements of the same n elements.

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define "similarity" in your case. –  KingsIndian Jun 17 '12 at 16:14
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If they both have exactly the same elements then what you are talking about is a called a permutation. –  Hunter McMillen Jun 17 '12 at 16:17
    
As KingsIndian put it: You need to define more closely what you mean by "similar". If you can do that, the definition will often lead itself naturally to an algorithm (at least if it is not to complicated). Some examples would be: Average distance between elements, Similarity based on the number of insert/delete/replace operations, some more similarity which have been defined to check the quality of retrieval algorithms, etc. Without a defintion of similarity or a use case, this is however impossible to answer. –  LiKao Jun 17 '12 at 16:18
    
How close are the two lists with respect to the order of elements. (Both lists have the same elements but each list has a random arragment of those elements.) –  user1030497 Jun 17 '12 at 16:18
    
Thanks, Hunter. Yes, to put it differently, given two nPn permutations of the same n-sized set, how similar are these two permutations? In the best case, the corresponding elements are equal, and in the worst case listA's elements are in reverse order as listB's elements. –  user1030497 Jun 17 '12 at 16:23

2 Answers 2

One way would be to calculate an edit distance, i.e. the minimum number of modification steps to transform one list to the other. This would basically be the same as a Levenshtein or Damerau-Levenshtein distance, but instead of a string of characters, you're comparing a list of elements.

http://en.wikipedia.org/wiki/Levenshtein_distance

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It sounds like you are looking for a metric over permutations. This paper is a survey of a few possibilities.

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