# Calculating Cosine Similarity between two graph nodes with different number of vectors

I'm implementing the paper titled "Efficient Graph-Based Semi-Supervised Learning of Structured Tagging Models" as part of my research.

As part of graph construction procedure which is the Section 3 of the paper, I need to define some kind of similarity measure to calculate edge weight for each edge connecting a pair of nodes. According to the paper, I have to create a PMI (Pointwise Mutual Information) vector for this purpose. What I have to do is to calculate PMIs for features occurring on each token.

Each n-gram is named "type" and each of its occurrences is named "token" in this paper.

As an example if we take x2-x3-x4 to be our current Type which occurs in two contexts x1-x2-x3-x4-x5 and x6-x2-x3-x4-x7 I have to compute a set of features relating to the type x2-x3-x4. But somehow this procedure seems complex and unclear. This is what I got:

• I should calculate PMI's for each feature on every Token. Which results in a vector of PMIs for each token and the final result would be an array of PMI vectors for the current Type. The array size will be equal to the count of tokens of a given type. Now as a final step I should measure similarity of different nodes. But the problem is that the resulting vector array of each type has a different size, so I can not compare these arrays with each other.

So, what is the solution? Did I made a mistake here?

## 1 Answer

For each trigram occurs in your data set, you can always get 9 features listed in Table 1. For 1-2-3-4-5 and 6-2-3-4-7, you also calculate the PMI between (12345) and (62346), (234) and (234), (12) and (62), (45) and (47), .... Note that some of the PMIs such as trigram,center word, trigram-center word are 0s, but they won't be if your selected trigrams to be compared are different. So the array size is supposed to retain.

• Let me check if I'm not mistaken. You mean that PMI is calculated between each token (occurrence) of the same type at the same position (Context Feature of all 10 tokens of 2-3-4), that would conclude to one single vector which is comparable to another type's vector. Am I right? – Moh Dec 28 '13 at 15:16
• Yes, but I think the definition is not limited to the same type. For example, you can also make such a comparison between 12345 and 62357, there is one word difference between 234 and 235, but such a 9-element array can still be obtained. – lennon310 Dec 28 '13 at 17:26
• Of course that's correct. Another problem is that there could me for example 700 tokens, so we could compute PMI between 700 items? Is there recursive or DP algorithm for it? Thanks – Moh Dec 28 '13 at 19:00
• You definitely need to compare each pairs. So even DP works, it still gives your an O(n^2). I'm not sure whether it is possible to preprocess the tokens and build a look-up table for the similar tokens – lennon310 Dec 28 '13 at 19:38