Estimating Density Models with Truncation Boundaries using Score Matching
Abstract
Truncated densities are probability density functions defined on truncated domains. They share the same parametric form with their non-truncated counterparts up to a normalizing constant. Since the computation of their normalizing constants is usually infeasible, Maximum Likelihood Estimation cannot be easily applied to estimate truncated density models. Score Matching (SM) is a powerful tool for fitting parameters using only unnormalized models. However, it cannot be directly applied here as boundary conditions used to derive a tractable SM objective are not satisfied by truncated densities. In this paper, we study parameter estimation for truncated probability densities using SM. The estimator minimizes a weighted Fisher divergence. The weight function is simply the shortest distance from a data point to the boundary of the domain. We show this choice of weight function naturally arises from minimizing the Stein discrepancy as well as upperbounding the finite-sample estimation error. The usefulness of our method is demonstrated by numerical experiments and a study on the Chicago crime data set. We also show that the proposed density estimation can correct the outlier-trimming bias caused by aggressive outlier detection methods.
Cite
@article{arxiv.1910.03834,
title = {Estimating Density Models with Truncation Boundaries using Score Matching},
author = {Song Liu and Takafumi Kanamori and Daniel J. Williams},
journal= {arXiv preprint arXiv:1910.03834},
year = {2022}
}
Comments
to be published in the Journal of Machine Learning Research