Variational Elliptical Processes
Abstract
We present elliptical processes—a family of non-parametric probabilistic models that subsumes Gaussian processes and Student's t processes. This generalization includes a range of new heavy-tailed behaviors while retaining computational tractability. Elliptical processes are based on a representation of elliptical distributions as a continuous mixture of Gaussian distributions. We parameterize this mixture distribution as a spline normalizing flow, which we train using variational inference. The proposed form of the variational posterior enables a sparse variational elliptical process applicable to large-scale problems. We highlight advantages compared to Gaussian processes through regression and classification experiments. Elliptical processes can supersede Gaussian processes in several settings, including cases where the likelihood is non-Gaussian or when accurate tail modeling is essential.
Cite
Text
Bånkestad et al. "Variational Elliptical Processes." Transactions on Machine Learning Research, 2023.Markdown
[Bånkestad et al. "Variational Elliptical Processes." Transactions on Machine Learning Research, 2023.](https://mlanthology.org/tmlr/2023/bankestad2023tmlr-variational/)BibTeX
@article{bankestad2023tmlr-variational,
title = {{Variational Elliptical Processes}},
author = {Bånkestad, Maria Margareta and Sjölund, Jens and Taghia, Jalil and Schön, Thomas B.},
journal = {Transactions on Machine Learning Research},
year = {2023},
url = {https://mlanthology.org/tmlr/2023/bankestad2023tmlr-variational/}
}