English

Weighted Empirical Risk Minimization: Sample Selection Bias Correction based on Importance Sampling

Machine Learning 2020-02-20 v2 Machine Learning

Abstract

We consider statistical learning problems, when the distribution PP' of the training observations Z1,  ,  ZnZ'_1,\; \ldots,\; Z'_n differs from the distribution PP involved in the risk one seeks to minimize (referred to as the test distribution) but is still defined on the same measurable space as PP and dominates it. In the unrealistic case where the likelihood ratio Φ(z)=dP/dP(z)\Phi(z)=dP/dP'(z) is known, one may straightforwardly extends the Empirical Risk Minimization (ERM) approach to this specific transfer learning setup using the same idea as that behind Importance Sampling, by minimizing a weighted version of the empirical risk functional computed from the 'biased' training data ZiZ'_i with weights Φ(Zi)\Phi(Z'_i). Although the importance function Φ(z)\Phi(z) is generally unknown in practice, we show that, in various situations frequently encountered in practice, it takes a simple form and can be directly estimated from the ZiZ'_i's and some auxiliary information on the statistical population PP. By means of linearization techniques, we then prove that the generalization capacity of the approach aforementioned is preserved when plugging the resulting estimates of the Φ(Zi)\Phi(Z'_i)'s into the weighted empirical risk. Beyond these theoretical guarantees, numerical results provide strong empirical evidence of the relevance of the approach promoted in this article.

Keywords

Cite

@article{arxiv.2002.05145,
  title  = {Weighted Empirical Risk Minimization: Sample Selection Bias Correction based on Importance Sampling},
  author = {Robin Vogel and Mastane Achab and Stéphan Clémençon and Charles Tillier},
  journal= {arXiv preprint arXiv:2002.05145},
  year   = {2020}
}

Comments

20 pages, 7 tables and figures

R2 v1 2026-06-23T13:39:56.712Z