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

Xiaohui Chen, Yun Yang

2020Bernoulli23 citationsDOIOpen Access PDF

Abstract

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.

Topics & Concepts

MathematicsRoundingCluster analysisHilbert spaceLog sum inequalityMultidimensional Chebyshev's inequalityEuclidean spaceApplied mathematicsRate of convergenceDimension (graph theory)Discrete mathematicsPure mathematicsCombinatoricsRearrangement inequalityMathematical analysisInequalityStatisticsOperating systemEngineeringElectrical engineeringComputer scienceChannel (broadcasting)Point processes and geometric inequalitiesRandom Matrices and ApplicationsSparse and Compressive Sensing Techniques
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