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Activity Number: 359 - Geometry and Bayes: Better Together
Type: Invited
Date/Time: Thursday, August 12, 2021 : 12:00 PM to 1:50 PM
Sponsor: International Society for Bayesian Analysis (ISBA)
Abstract #314442
Title: Diffusion-Based Gaussian Processes on Restricted Domains
Author(s): David Dunson and Hau-Tieng Wu and Nan Wu*
Companies: Duke University and Duke University and Duke University
Keywords: Bayesian; Graph Laplacian; Heat kernel; Nonparametric regression; Manifold; Spatial process modeling
Abstract:

In nonparametric regression and spatial process modeling, it is common for the inputs to fall in a restricted subset of Euclidean space. Typical kernel-based methods that do not take into account the intrinsic geometric of the domain across which observations are collected may produce sub-optimal results. We focus on solving this problem in the context of Gaussian process (GP) models, proposing a new class of diffusion-based GPs (DB-GPs), which learn a covariance that respects the geometry of the input domain. We use the term `diffusion-based' as the idea is to measure intrinsic distances between inputs in a restricted domain via a diffusion process. As the heat kernel is intractable computationally, we approximate the covariance using finitely-many eigenpairs of the Graph Laplacian (GL). The theory for the DB-GP methodology will be introduced in the talk. Finally, the performance of DB-GP on toy examples, simulation studies, and applications to ecology data will be illustrated.


Authors who are presenting talks have a * after their name.

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