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arxiv: 1205.2609 · v1 · pith:M2NWWIHTnew · submitted 2012-05-09 · 📊 stat.ML · cs.LG

Which Spatial Partition Trees are Adaptive to Intrinsic Dimension?

classification 📊 stat.ML cs.LG
keywords treesintrinsicpartitionspatialadaptivedimensionstructuretheory
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Recent theory work has found that a special type of spatial partition tree - called a random projection tree - is adaptive to the intrinsic dimension of the data from which it is built. Here we examine this same question, with a combination of theory and experiments, for a broader class of trees that includes k-d trees, dyadic trees, and PCA trees. Our motivation is to get a feel for (i) the kind of intrinsic low dimensional structure that can be empirically verified, (ii) the extent to which a spatial partition can exploit such structure, and (iii) the implications for standard statistical tasks such as regression, vector quantization, and nearest neighbor search.

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