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I need to implement algorithm (or find one in an open source library) for evaluation of text similarities. I need an efficient algorithm for given two arbitrary sets of documents (relatively small number of big chunks of text) it to create a matching pairs between them - which document is most likely to be produced from which one.

I believe I will split this in two - defining the similarity coefficient of every pair - and then applying some of the assignment problem algorithms. While for the assignment algorithms I can find a good number of solutions I cannot find a good one for the computing the similarity coefficients.

Note the documents are not known in advance - computing indexes of the text (if there is) must be fast as well.

I am aware of Hamming distance, Levenshtein distance some of the other algorithms for string difference. This is not what I am looking for though - I am using the word text instead string on purpose.

I am not looking for phrase search algorithms as well what libraries like Lucene and Xapian are made for (at least seems to be).

Probably something based on tf–idf.

I guess the question is, is there something that already solves this problem or is it possible libraries like lucete to be used to do that.

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closed as not constructive by Will May 17 '13 at 21:03

As it currently stands, this question is not a good fit for our Q&A format. We expect answers to be supported by facts, references, or expertise, but this question will likely solicit debate, arguments, polling, or extended discussion. If you feel that this question can be improved and possibly reopened, visit the help center for guidance.If this question can be reworded to fit the rules in the help center, please edit the question.

    
Maybe you could use a slightly modifies version of the longest common subsequence algorithm, which is used in the linux diff command. More info here: en.wikipedia.org/wiki/Longest_common_subsequence_problem – OGH May 16 '13 at 20:37
    
yes, this is an option. Unfortunately it seems overly expensive performance wise because it needs to be done independently for every pair. I am hoping to find something that will reduce the complexity per pair comparison based on some form of indexing. thanks – gsf May 16 '13 at 20:59
    
You might want to look at a paper by Coeurjolly, Drouilhet and Robineau. I found it quite useful the last time I worked on something like this (though it was quite new at the time -- there may be better papers now). – Jerry Coffin May 17 '13 at 0:49
    
The Levenstein Distance algorithm is available on Wikipedia: en.wikipedia.org/wiki/Levenshtein_distance – Alexis Wilke Nov 7 '14 at 7:50

Here is what I would do as a starting point (just because it is simple and fast):

  • Map the words to numbers using a shared map or hash_map
  • For each text, build the corresponding map of word-level trigram counts
  • Compare the overlap

We can assume that the dictionary size is < 1m (or 21bit), so we can just encode a trigram in an int64.

void CountTrigrams(const vector<string>& words, 
                   map<string, int> * dict, 
                   map<int64, int> * result) {
  int64 trigram = 0;
  for (int i = 0; i < words.size(); i++) {
    const& word = words[i];
    int id;
    auto di = dict->find(word);
    if (di == dict->end()) {
      id = dict.size();
      dict[word] = id;
    } else {
      id = di->second;
    }
    trigram = ((trigram << 21) | id) & 0x7fffffffffffffff;
    if (i > 2) {
      auto ti = result->find(trigram);
      if (ti == result->end()) {
        result[trigram] = 1;
      } else {
        ti->second++;
      }
    }
  }
}

Then compare the results for each pair:

int Compare(const map<int64, int> & t1, const map<int64, int> & t2) {
  int score = 0;
  for (auto i = t1.first(); i != t1.end(); i++) {
    auto j = t2.find(t1->first);
    if (j != t2.end()) {
      score += MAX(i->second, j->second);
    }
  }
  return score;
}

It may make sense to normalize the score somehow, e.g. divide by the total number of trigrams.

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