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Hanson-Wright inequality in Hilbert spaces with application to K-means clustering for non-Euclidean data

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arxiv 1810.11180 v3 pith:XC3YJWVP submitted 2018-10-26 math.ST math.PRstat.TH

Hanson-Wright inequality in Hilbert spaces with application to K-means clustering for non-Euclidean data

classification math.ST math.PRstat.TH
keywords inequalityclusteringhanson-wrightmeansapplicationdatageneralizedhilbert
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We derive a dimension-free Hanson-Wright inequality for quadratic forms of independent sub-gaussian random variables in a separable Hilbert space. Our inequality is an infinite-dimensional generalization of the classical Hanson-Wright inequality for finite-dimensional Euclidean random vectors. We illustrate an application to the generalized $K$-means clustering problem for non-Euclidean data. Specifically, we establish the exponential rate of convergence for a semidefinite relaxation of the generalized $K$-means, which together with a simple rounding algorithm imply the exact recovery of the true clustering structure.

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