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Algorithm for obtaining vector representations of words From Wikipedia, the free encyclopedia
GloVe, coined from Global Vectors, is a model for distributed word representation. The model is an unsupervised learning algorithm for obtaining vector representations for words. This is achieved by mapping words into a meaningful space where the distance between words is related to semantic similarity.[1] Training is performed on aggregated global word-word co-occurrence statistics from a corpus, and the resulting representations showcase interesting linear substructures of the word vector space. As log-bilinear regression model for unsupervised learning of word representations, it combines the features of two model families, namely the global matrix factorization and local context window methods.
It is developed as an open-source project at Stanford[2] and was launched in 2014. It was designed as a competitor to word2vec, and the original paper noted multiple improvements of GloVe over word2vec. As of 2022[update], both approaches are outdated, and Transformer-based models, such as ELMo and BERT, which add multiple neural-network attention layers on top of a word embedding model similar to Word2vec, have come to be regarded as the state of the art in NLP.[3]
You shall know a word by the company it keeps (Firth, J. R. 1957:11)[4]
The idea of GloVe is to construct, for each word , two vectors , such that the relative positions of the vectors capture part of the statistical regularities of the word . The statistical regularity is defined as the co-occurrence probabilities. Words that resemble each other in meaning should also resemble each other in co-occurrence probabilities.
Let the vocabulary be , the set of all possible words (aka "tokens"). Punctuation is either ignored, or treated as vocabulary, and similarly for capitalization and other typographical details.[1]
If two words occur close to each other, then we say that they occur in the context of each other. For example, if the context length is 3, then we say that in the following sentence
GloVe1, coined2 from3 Global4 Vectors5, is6 a7 model8 for9 distributed10 word11 representation12
the word "model8" is in the context of "word11" but not the context of "representation12".
A word is not in the context of itself, so "model8" is not in the context of the word "model8", although, if a word appears again in the same context, then it does count.
Let be the number of times that the word appears in the context of the word over the entire corpus. For example, if the corpus is just "I don't think that that is a problem." we have since the first "that" appears in the second one's context, and vice versa.
Let be the number of words in the context of all instances of word . By counting, we have(except for words occurring right at the start and end of the corpus)
Let be the co-occurrence probability. That is, if one samples a random occurrence of the word in the entire document, and a random word within its context, that word is with probability . Note that in general. For example, in a typical modern English corpus, is close to one, but is close to zero. This is because the word "ado" is almost only used in the context of the archaic phrase "much ado about", but the word "much" occurs in all kinds of contexts.
For example, in a 6 billion token corpus, we have
Probability and Ratio | ||||
---|---|---|---|---|
Inspecting the table, we see that the words "ice" and "steam" are indistinguishable along the "water" (often co-occurring with both) and "fashion" (rarely co-occurring with either), but distinguishable along the "solid" (co-occurring more with ice) and "gas" (co-occurring more with "steam").
The idea is to learn two vectors for each word , such that we have a multinomial logistic regression:and the terms are unimportant parameters.
This means that if the words have similar co-occurrence probabilities , then their vectors should also be similar: .
Naively, logistic regression can be run by minimizing the squared loss:However, this would be noisy for rare co-occurrences. To fix the issue, the squared loss is weighted so that the loss is slowly ramped-up as the absolute number of co-occurrences increases:whereand are hyperparameters. In the original paper, the authors found that seem to work well in practice.
Once a model is trained, we have 4 trained parameters for each word: . The parameters are irrelevant, and only are relevant.
The authors recommended using as the final representation vector for word , because empirically it worked better than or alone.
GloVe can be used to find relations between words like synonyms, company-product relations, zip codes and cities, etc. However, the unsupervised learning algorithm is not effective in identifying homographs, i.e., words with the same spelling and different meanings. This is as the unsupervised learning algorithm calculates a single set of vectors for words with the same morphological structure.[5] The algorithm is also used by the SpaCy library to build semantic word embedding features, while computing the top list words that match with distance measures such as cosine similarity and Euclidean distance approach.[6] GloVe was also used as the word representation framework for the online and offline systems designed to detect psychological distress in patient interviews.[7]
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