# Better way of calculating document Similarity using Lucene

I’m indexing a collection of documents using Lucene by specifying TermVector at indexing time. Then I retrieve terms and their frequencies by reading the index and calculating TF-IDF score vectors for each document. Then, using the TF-IDF vectors, I calculate pairwise cosine similarity between documents using Wikipedia's cosine similarity equation.

This is my problem: Say I have two identical documents “A” and “B” in this collection (A and B have more than 200 sentences). If I calculate pairwise cosine similarity between A and B it gives me cosine value=1 which is perfectly OK. But if I remove a single sentence from Doc “B”, it gives me cosine similarity value around 0.85 between these two documents. The documents are almost similar but cosine values are not. I understand the problem is with the equation that I’m using.

Is there better way / equation that I can use for calculating cosine similarity between documents?

Edited

This is how I calculate Cosine Similarity, `doc1[]` and `doc2[]` are TF-IDF vectors for corresponding document. the vector contains only the `scores` but not the `words`

``````private double cosineSimBetweenTwoDocs(float doc1[], float doc2[]) {
double temp;
int doc1Len = doc1.length;
int doc2Len = doc2.length;
float numerator = 0;
float temSumDoc1 = 0;
float temSumDoc2 = 0;
double equlideanNormOfDoc1 = 0;
double equlideanNormOfDoc2 = 0;
if (doc1Len > doc2Len) {
for (int i = 0; i < doc2Len; i++) {
numerator += doc1[i] * doc2[i];
temSumDoc1 += doc1[i] * doc1[i];
temSumDoc2 += doc2[i] * doc2[i];
}
equlideanNormOfDoc1=Math.sqrt(temSumDoc1);
equlideanNormOfDoc2=Math.sqrt(temSumDoc2);
} else {
for (int i = 0; i < doc1Len; i++) {
numerator += doc1[i] * doc2[i];
temSumDoc1 += doc1[i] * doc1[i];
temSumDoc2 += doc2[i] * doc2[i];
}
equlideanNormOfDoc1=Math.sqrt(temSumDoc1);
equlideanNormOfDoc2=Math.sqrt(temSumDoc2);
}

temp = numerator / (equlideanNormOfDoc1 * equlideanNormOfDoc2);
return temp;
}
``````
-
I guess something is wrong about your code. Removing one sentence from 200 sentences should give you a number > 0.98. To verify it, you can generate a random vector, make a modification to the vector and compute the cosine similarity for it to see what you get. For a vector of size 1000, and random numbers in the range [10,100], if I subtract a random number in the range [10,20] from all the numbers in the vector, the resulting similarity measure is always > 0.98 for me. –  Mohsen May 18 '12 at 9:44
I used Mathematica to verify the case. Here is my code: a = RandomInteger[{10, 100}, 1000]; b = a - RandomInteger[{10, 20}, 1000]; {Total[a], Total[b], Total[a - b], N[(a.b)/(Norm[a] Norm[b])]}, and here is the output: {55419, 40271, 15148, 0.98811} –  Mohsen May 18 '12 at 9:45
@Mohsen Removing One sentences from the Vector B will reduce the number of elements in that vector, if we get a vector of size 1000 after removing sentences the size of vector B will become say 995, and now vector A is size of 1000 but, two vectors are not aligned too. By removing a sentence, the vector elements are removed from middle but not from end of the vector. So if you can try by removing vector elements from middle, you can observe 0.85 value –  Kasun May 18 '12 at 10:39
See my answer bellow. –  Mohsen May 18 '12 at 11:10

As I told you in my comment, I think you made a mistake somewhere. The vectors actually contain the `<word,frequency>` pairs, not `words` only. Therefore, when you delete the sentence, only the frequency of the corresponding words are subtracted by 1 (the words after are not shifted). Consider the following example:

Document a:

``````A B C A A B C. D D E A B. D A B C B A.
``````

Document b:

``````A B C A A B C. D A B C B A.
``````

Vector a:

``````A:6, B:5, C:3, D:3, E:1
``````

Vector b:

``````A:5, B:4, C:3, D:1, E:0
``````

Which result in the following similarity measure:

``````(6*5+5*4+3*3+3*1+1*0)/(Sqrt(6^2+5^2+3^2+3^2+1^2) Sqrt(5^2+4^2+3^2+1^2+0^2))=
62/(8.94427*7.14143)=
0.970648
``````

Edit I think your source code is not working as well. Consider the following code which works fine with the above example:

``````import java.util.HashMap;
import java.util.Map;

public class DocumentVector {
Map<String, Integer> wordMap = new HashMap<String, Integer>();

public void incCount(String word) {
Integer oldCount = wordMap.get(word);
wordMap.put(word, oldCount == null ? 1 : oldCount + 1);
}

double getCosineSimilarityWith(DocumentVector otherVector) {
double innerProduct = 0;
for(String w: this.wordMap.keySet()) {
innerProduct += this.getCount(w) * otherVector.getCount(w);
}
return innerProduct / (this.getNorm() * otherVector.getNorm());
}

double getNorm() {
double sum = 0;
for (Integer count : wordMap.values()) {
sum += count * count;
}
return Math.sqrt(sum);
}

int getCount(String word) {
return wordMap.containsKey(word) ? wordMap.get(word) : 0;
}

public static void main(String[] args) {
String doc1 = "A B C A A B C. D D E A B. D A B C B A.";
String doc2 = "A B C A A B C. D A B C B A.";

DocumentVector v1 = new DocumentVector();
for(String w:doc1.split("[^a-zA-Z]+")) {
v1.incCount(w);
}

DocumentVector v2 = new DocumentVector();
for(String w:doc2.split("[^a-zA-Z]+")) {
v2.incCount(w);
}

System.out.println("Similarity = " + v1.getCosineSimilarityWith(v2));
}

}
``````
-
I'm removing the sentences manually from Doc "B" and then do the indexing with Lucene. So for your example, in Doc "B" Lucene dosen't know that there was a term "E" in the document "B" previously. –  Kasun May 19 '12 at 1:33
Take this example Doc A{ABCEEBC. DDEEB. DEBCBE} Doc B{DDEEB.DEBCBE} So now Vector A{A-1,B-5,C-3,D-3,E-6} (Vector A Size=5); Vector B{B-3,C-1,D-3,E-4} (Vector B Size=4). So this shows actually terms are shifted, so it will be comparing Term- "A" from vector A with Term "B" of vector B. This outputs cosine value around ~0.7. Is there a way of removing sentences AFTER indexing in Lucene? –  Kasun May 19 '12 at 1:43
@Kasun: I myself have implemented the cosine similarity measure a few years ago as I described you and it used to work perfectly. The problem is that you think the words must be shifted while they must not. This is true that vectors a and b in the above example are not of a same size, but if a term does not exist in a vector, its frequency is simply supposed to be zero. So, the frequency of term E in document a is 1 while its frequency in document b is 0 (because it doesn't exist). –  Mohsen May 19 '12 at 2:42
Lucene doesn't need to know whether it was deleted or has never existed at all. As an additional example the frequency of the term F (or any other one that is not in either of the documents) is 0 both in vector a and b. I am pretty sure you are using Lucene in a wrong way. Could you please edit your question and add a minimal code snippet that demonstrates your problem. –  Mohsen May 19 '12 at 2:43
I have edited the question with my cosine similarity calculation code. Please check. –  Kasun May 19 '12 at 3:00