Related papers: Gaussian Processes and Statistical Decision-making in Non-Euclidean Spaces

Gaussian Processes and Statistical Decision-making in Non-Euclidean Spaces

URL: http://arxiv.org/abs/2202.10613v1
Date: Tue, 22 Feb 2022 01:42:57 GMT
Title: Gaussian Processes and Statistical Decision-making in Non-Euclidean Spaces
Authors: Alexander Terenin
Abstract summary: We develop techniques for broadening the applicability of Gaussian processes. We introduce a wide class of efficient approximations built from this viewpoint. We develop a collection of Gaussian process models over non-Euclidean spaces.
Score: 96.53463532832939
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Bayesian learning using Gaussian processes provides a foundational framework for making decisions in a manner that balances what is known with what could be learned by gathering data. In this dissertation, we develop techniques for broadening the applicability of Gaussian processes. This is done in two ways. Firstly, we develop pathwise conditioning techniques for Gaussian processes, which allow one to express posterior random functions as prior random functions plus a dependent update term. We introduce a wide class of efficient approximations built from this viewpoint, which can be randomly sampled once in advance, and evaluated at arbitrary locations without any subsequent stochasticity. This key property improves efficiency and makes it simpler to deploy Gaussian process models in decision-making settings. Secondly, we develop a collection of Gaussian process models over non-Euclidean spaces, including Riemannian manifolds and graphs. We derive fully constructive expressions for the covariance kernels of scalar-valued Gaussian processes on Riemannian manifolds and graphs. Building on these ideas, we describe a formalism for defining vector-valued Gaussian processes on Riemannian manifolds. The introduced techniques allow all of these models to be trained using standard computational methods. In total, these contributions make Gaussian processes easier to work with and allow them to be used within a wider class of domains in an effective and principled manner. This, in turn, makes it possible to potentially apply Gaussian processes to novel decision-making settings.

Related papers

Posterior Contraction Rates for Mat\'ern Gaussian Processes on Riemannian Manifolds [51.68005047958965]
We show that intrinsic Gaussian processes can achieve better performance in practice. Our work shows that finer-grained analyses are needed to distinguish between different levels of data-efficiency.
arXiv Detail & Related papers (2023-09-19T20:30:58Z)
Vector-valued Gaussian Processes on Riemannian Manifolds via Gauge Equivariant Projected Kernels [108.60991563944351]
We present a recipe for constructing gauge equivariant kernels, which induce vector-valued Gaussian processes coherent with geometry. We extend standard Gaussian process training methods, such as variational inference, to this setting.
arXiv Detail & Related papers (2021-10-27T13:31:10Z)
Advanced Stationary and Non-Stationary Kernel Designs for Domain-Aware Gaussian Processes [0.0]
We propose advanced kernel designs that only allow for functions with certain desirable characteristics to be elements of the reproducing kernel Hilbert space (RKHS) We will show the impact of advanced kernel designs on Gaussian processes using several synthetic and two scientific data sets.
arXiv Detail & Related papers (2021-02-05T22:07:56Z)
Pathwise Conditioning of Gaussian Processes [72.61885354624604]
Conventional approaches for simulating Gaussian process posteriors view samples as draws from marginal distributions of process values at finite sets of input locations. This distribution-centric characterization leads to generative strategies that scale cubically in the size of the desired random vector. We show how this pathwise interpretation of conditioning gives rise to a general family of approximations that lend themselves to efficiently sampling Gaussian process posteriors.
arXiv Detail & Related papers (2020-11-08T17:09:37Z)
Mat\'ern Gaussian Processes on Graphs [67.13902825728718]
We leverage the partial differential equation characterization of Mat'ern Gaussian processes to study their analog for undirected graphs. We show that the resulting Gaussian processes inherit various attractive properties of their Euclidean and Euclidian analogs. This enables graph Mat'ern Gaussian processes to be employed in mini-batch and non-conjugate settings.
arXiv Detail & Related papers (2020-10-29T13:08:07Z)
Mat\'ern Gaussian processes on Riemannian manifolds [81.15349473870816]
We show how to generalize the widely-used Mat'ern class of Gaussian processes. We also extend the generalization from the Mat'ern to the widely-used squared exponential process.
arXiv Detail & Related papers (2020-06-17T21:05:42Z)

This list is automatically generated from the titles and abstracts of the papers in this site.

This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.