Adaptive learning of density ratios in RKHS
Zellinger, Werner, Kindermann, Stefan, Pereverzyev, Sergei V.
Estimating the ratio of two probability densities from finitely many observations of the densities is a central problem in machine learning and statistics with applications in two-sample testing, divergence estimation, generative modeling, covariate shift adaptation, conditional density estimation, and novelty detection. In this work, we analyze a large class of density ratio estimation methods that minimize a regularized Bregman divergence between the true density ratio and a model in a reproducing kernel Hilbert space (RKHS). We derive new finite-sample error bounds, and we propose a Lepskii type parameter choice principle that minimizes the bounds without knowledge of the regularity of the density ratio. In the special case of quadratic loss, our method adaptively achieves a minimax optimal error rate. A numerical illustration is provided.
Jan-2-2024
- Country:
- Europe
- United Kingdom > England
- Cambridgeshire > Cambridge (0.04)
- Austria > Upper Austria
- Linz (0.04)
- United Kingdom > England
- Asia > Middle East
- Jordan (0.04)
- Europe
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- Research Report (0.82)
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