English

Consistent Kernel Mean Estimation for Functions of Random Variables

Machine Learning 2018-06-04 v1

Abstract

We provide a theoretical foundation for non-parametric estimation of functions of random variables using kernel mean embeddings. We show that for any continuous function ff, consistent estimators of the mean embedding of a random variable XX lead to consistent estimators of the mean embedding of f(X)f(X). For Mat\'ern kernels and sufficiently smooth functions we also provide rates of convergence. Our results extend to functions of multiple random variables. If the variables are dependent, we require an estimator of the mean embedding of their joint distribution as a starting point; if they are independent, it is sufficient to have separate estimators of the mean embeddings of their marginal distributions. In either case, our results cover both mean embeddings based on i.i.d. samples as well as "reduced set" expansions in terms of dependent expansion points. The latter serves as a justification for using such expansions to limit memory resources when applying the approach as a basis for probabilistic programming.

Keywords

Cite

@article{arxiv.1610.05950,
  title  = {Consistent Kernel Mean Estimation for Functions of Random Variables},
  author = {Carl-Johann Simon-Gabriel and Adam Ścibior and Ilya Tolstikhin and Bernhard Schölkopf},
  journal= {arXiv preprint arXiv:1610.05950},
  year   = {2018}
}

Comments

17 pages including appendix

R2 v1 2026-06-22T16:25:11.601Z