I'm trying to adjust cosine similarity to determine how similar two vectors are, with respect to entries. Since the obtained measure is invariant under vector scale {(0, 1, 2) and (0, 2, 4) have cosine similarity of 1}, what would be the way to extend the similarity measure to account for the initial vector scale? I thought of multiplying by min{v1, v2}/max{v1, v2}, with v denoting a vector v norm, to preserve the bounds of 1 and 1. Any suggestions are highly appreciated.
We started with Q&A. Technical documentation is next, and we need your help.
Whether you're a beginner or an experienced developer, you can contribute.
Well, cosine similarity is based on the angle between both vectors (which doesn't depend on the length of the vectors). If you need something that takes the length of the vectors into account then you need to think about how vector length influences similarity in your context. Also note that you can always postprocess a similarity or distance measure if need to stay within certain boundaries (like For example, instead of extending the cosine similarity you could try the Euclidean distance with an appropriate transformation:
But as I said, the "correct" formula depends on your context. 

