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Condition Number Analysis of Kernel-based Density Ratio Estimation

Machine Learning 2009-12-16 v1 Statistics Theory Statistics Theory

Abstract

The ratio of two probability densities can be used for solving various machine learning tasks such as covariate shift adaptation (importance sampling), outlier detection (likelihood-ratio test), and feature selection (mutual information). Recently, several methods of directly estimating the density ratio have been developed, e.g., kernel mean matching, maximum likelihood density ratio estimation, and least-squares density ratio fitting. In this paper, we consider a kernelized variant of the least-squares method and investigate its theoretical properties from the viewpoint of the condition number using smoothed analysis techniques--the condition number of the Hessian matrix determines the convergence rate of optimization and the numerical stability. We show that the kernel least-squares method has a smaller condition number than a version of kernel mean matching and other M-estimators, implying that the kernel least-squares method has preferable numerical properties. We further give an alternative formulation of the kernel least-squares estimator which is shown to possess an even smaller condition number. We show that numerical studies meet our theoretical analysis.

Keywords

Cite

@article{arxiv.0912.2800,
  title  = {Condition Number Analysis of Kernel-based Density Ratio Estimation},
  author = {Takafumi Kanamori and Taiji Suzuki and Masashi Sugiyama},
  journal= {arXiv preprint arXiv:0912.2800},
  year   = {2009}
}

Comments

37 pages, 1 figure, submitted

R2 v1 2026-06-21T14:23:52.473Z