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Activity Number: 376 - SBSS Paper Competition Winners (Part 2)
Type: Topic-Contributed
Date/Time: Thursday, August 12, 2021 : 12:00 PM to 1:50 PM
Sponsor: Section on Bayesian Statistical Science
Abstract #317217
Title: Graphical Gaussian Process Models for Highly Multivariate Spatial Data
Author(s): Debangan Dey* and Abhirup Datta and Sudipto Banerjee
Companies: Johns Hopkins Bloomberg School of Public Health and Johns Hopkins University and University of California Los Angeles
Keywords: Graphical model; Covariance selection; Matern Gaussian processes; Conditional independence
Abstract:

For multivariate spatial processes, common cross-covariance functions do not exploit graphical models to ensure process-level conditional independence among the variables. This is undesirable, especially for highly multivariate settings, where popular cross-covariance functions such as the multivariate Matérn suffer from a "curse of dimensionality" as the number of parameters and floating point operations scale up in quadratic and cubic order, respectively, in the number of variables. We propose a class of multivariate "graphical Gaussian Processes" using a general construction called "stitching" that crafts cross-covariance functions from graphs and ensure process-level conditional independence among variables. For the Matérn family, stitching yields a multivariate GP whose univariate components are Matérn, and conforms to process-level conditional independence as specified by the graph. For highly multivariate settings and decomposable graphical models, stitching offers massive computational gains and parameter dimension reduction. We demonstrate our approach to jointly model highly multivariate spatial data using simulation examples and an application to air-pollution modelling.


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

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