Park, HaesunJeon, MoonguHowland, Peg2020-09-022020-09-022001-03-05https://hdl.handle.net/11299/215460In today's vector space information retrieval systems, dimension reduction is imperative for efficiently manipulating the massive quantity of data. To be useful, this lower dimensional representation must be a good approximation of the full document set. To that end, we adapt and extend the discriminant analysis projection used in pattern recognition. This projection preserves cluster structure by maximizing the scatter between clusters while minimizing the scatter within clusters. A limitation of discriminant analysis is that one of its scatter matrices must be nonsingular, which restricts its application to document sets in which the number of terms does not exceed the number of documents. We show that by using the generalized singular value decomposition (GSVD), we can achieve the same goal regardless of the relative dimensions of our data. We also show that, for k clusters, the right generalized singular vectors that correspond to the k-1 largest generalized singular values are all we need to compute the optimal transformation to the reduced dimension. In addition, applying the GSVD allows us to avoid the explicit formation of the scatter matrices in favor of working directly with the data matrix, thus improving the numerical properties of the approach. Finally, we present experimental results that confirm the effectiveness of our approach.en-USReport