# Grouping similar sets algorithm

I have a search engine. The search engine generates results when is searched for a keyword. What I need is to find all other keywords which generate similar results.

For example keyword k1 gives result set R1 = { 1,2,3,4,5,...40 }, which contains up to 40 document ids. And I need to get a list of all other keywords K1 which generate results similar to what k1 generates.

The similarity S(R1, R2) between two result sets R1 and R2 is computed as follows:
`2 * (number of same elements both in _R1_ and _R2_) / ( (total number of elements in _R1_) + (total number of elements in _R2_) )`. Example: R1 = {1,2,3} and R2 = {2,3,4,5} gives S(R1, R2) = (2*|{2,3}|) / |{1,2,3}| + |{2,3,4,5}| = (2*2)/(3+4) = 4/7 = 0.57.

There are more than 100,000 keywords thus more than 100,000 result sets. So far I only was able to solve this problem the hard way O(N^2), where each result set is comprated to every other set. This takes a lot of time.

Is there someone with a better idea?

Some similar post which not solve the problem completely:

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One question are the results in sorted order?

Something which came to mind combine both the sets , sort it and find duplicates. It can be reduced to O(nlogn)

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You would still need to combine every set with another set, which gives n*(n-1) combinations, right? –  ddofborg Mar 1 '11 at 15:35

To make the problem be simple, it is supposed that all the key words have 10 results ans k1 is the key word to be compared. You remove 9 results from the set of each key word. Now compare the last result with k1's and the key words with the same last result is what you want. If a key word has 1 result in common with k1, there is only 1% probability that it will remain. A key word with 5 results in common with k1 will have 25% probability to remain. Maybe you will think that 1% is too big, then you can repeat the process above n times and the key word with 1 result in common will have 1%^n probability to remain. The time is O(N).

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Is your similarity criterium fixed, or can we apply a bit of variety to achieve faster search engine?

Alternative:

An alternative that came to my mind:

Given your result set R1, you could go through the documents and create a histogram over other keywords that those documents would be matched to. Then, if given alternative keyword gets, say, at least #R1/2 hits, you list it as "similar".

The big difference is, that you do not consider documents that are not in R1 at all.

Exact?

If you need a solution exact to your requirements, I believe it would suffice to compute R2 set only for those keywords that satisfy the above "alternative" criterium. I think (mathematical proof needed!) that if the "alternative" criterium is not satisfied, there is no chance that yours will be.

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