# Cosine Similarity of Vectors, with < O(n^2) complexity

Having looked around this site for similar issues, I found this: http://math.nist.gov/javanumerics/jama/ and this: http://sujitpal.blogspot.com/2008/09/ir-math-with-java-similarity-measures.html

However, it seems these run in O(n^2). I've been doing some document clustering and noticed this level of complexity wasn't feasible when dealing with even small document sets. Given, for the dot product, we only need the vector terms contained in both vectors it should be possible to put the vectors in a tree and thus compute the dot product with n log n complexity, where n is the lowest number of unique terms in 1 of the 2 documents.

Am I missing something? Is there a java library which does this?

thanks

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You're not going to have a lot of luck expecting people to read both those pages. Perhaps you could explain your problem more clearly - why are you multiplying vectors (and what do you mean, O(n^2)? Computing the dot-product of two n-dimensional vectors is trivially O(n), I highly doubt any vector package could screw up that badly) –  BlueRaja - Danny Pflughoeft Jul 27 '10 at 19:21
He is computing dot product for every pair of documents. That makes it quadratically complex. –  Rekin Jul 27 '10 at 19:25
BlueRaja - Danny Pflughoeft, this problem is about multiplying very large-dimensional but very sparse vectors; and n is not dimension but count of non-zero elements. –  dmitry_vk Jul 27 '10 at 19:25

If you store the vector elements in a hashtable, lookup is only log n anyway, no? Loop over all keys in the smaller document and see if they exist in the larger one..?

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Any class you would recommend? I figure this one is pretty good, if memory is an issue: java2s.com/Code/Java/Collections-Data-Structure/… –  Ash Jul 27 '10 at 18:18
Wow can't judge this so quickly, but you can always go with a normal java.util.HashMap to begin with. Btw since you're saying it's an effect of document collection size: If you compare each document to each document, you have another quadratic term (now in the number of documents) wrapped around the (n*log n) term. For me, this part has often been far more problematic than the actual cosine computation. Could this be the case for you as well? –  Nicolas78 Jul 27 '10 at 18:32
I do trimming on the cluster set to get the comparison down to a constant, but for something like GAHC you're completely correct, you have an n^2 problem, where n is the number of clusters to be compared. –  Ash Jul 27 '10 at 21:34

Hashmap is good, but it might take a lot of memory.

If your vectors are stored as key-value pairs sorted by key then vector multiplication can be done in O(n): you just have to iterate in parallel over both vectors (the same iteration is used e.g. in merge sort algorithm). The pseudocode for multiplication:

``````i = 0
j = 0
result = 0
while i < length(vec1) && j < length(vec2):
if vec1[i].key == vec2[j].key:
result = result + vec1[i].value * vec2[j].value
else if vec1[i].key < vec2[j].key:
i = i + 1
else
j = j + 1
``````
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I like this idea, thanks. Is there a java library which uses this principle? –  Ash Jul 27 '10 at 21:31
I don't know; but lucene (lucene.apache.org/java/docs/index.html) might contain such algorithm. –  dmitry_vk Jul 28 '10 at 18:09
Thanks dmitry-vk, it seems a sorted map would probably be best: java.sun.com/j2se/1.4.2/docs/api/java/util/SortedMap.html –  Ash Jul 29 '10 at 3:56