Learning deep kernels for exponential family densities
Abstract
The kernel exponential family is a rich class of distributions, which can be fit efficiently and with statistical guarantees by score matching. Being required to choose a priori a simple kernel such as the Gaussian, however, limits its practical applicability. We provide a scheme for learning a kernel parameterized by a deep network, which can find complex location-dependent local features of the data geometry. This gives a very rich class of density models, capable of fitting complex structures on moderate-dimensional problems. Compared to deep density models fit via maximum likelihood, our approach provides a complementary set of strengths and tradeoffs: in empirical studies, the former can yield higher likelihoods, whereas the latter gives better estimates of the gradient of the log density, the score, which describes the distribution's shape.
Cite
@article{arxiv.1811.08357,
title = {Learning deep kernels for exponential family densities},
author = {Li Wenliang and Danica J. Sutherland and Heiko Strathmann and Arthur Gretton},
journal= {arXiv preprint arXiv:1811.08357},
year = {2021}
}