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Main Authors: Perez, Raphaël Carpintero, da Veiga, Sébastien, Garnier, Josselin, Staber, Brian
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2402.03838
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author Perez, Raphaël Carpintero
da Veiga, Sébastien
Garnier, Josselin
Staber, Brian
author_facet Perez, Raphaël Carpintero
da Veiga, Sébastien
Garnier, Josselin
Staber, Brian
contents Supervised learning has recently garnered significant attention in the field of computational physics due to its ability to effectively extract complex patterns for tasks like solving partial differential equations, or predicting material properties. Traditionally, such datasets consist of inputs given as meshes with a large number of nodes representing the problem geometry (seen as graphs), and corresponding outputs obtained with a numerical solver. This means the supervised learning model must be able to handle large and sparse graphs with continuous node attributes. In this work, we focus on Gaussian process regression, for which we introduce the Sliced Wasserstein Weisfeiler-Lehman (SWWL) graph kernel. In contrast to existing graph kernels, the proposed SWWL kernel enjoys positive definiteness and a drastic complexity reduction, which makes it possible to process datasets that were previously impossible to handle. The new kernel is first validated on graph classification for molecular datasets, where the input graphs have a few tens of nodes. The efficiency of the SWWL kernel is then illustrated on graph regression in computational fluid dynamics and solid mechanics, where the input graphs are made up of tens of thousands of nodes.
format Preprint
id arxiv_https___arxiv_org_abs_2402_03838
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Gaussian process regression with Sliced Wasserstein Weisfeiler-Lehman graph kernels
Perez, Raphaël Carpintero
da Veiga, Sébastien
Garnier, Josselin
Staber, Brian
Machine Learning
Supervised learning has recently garnered significant attention in the field of computational physics due to its ability to effectively extract complex patterns for tasks like solving partial differential equations, or predicting material properties. Traditionally, such datasets consist of inputs given as meshes with a large number of nodes representing the problem geometry (seen as graphs), and corresponding outputs obtained with a numerical solver. This means the supervised learning model must be able to handle large and sparse graphs with continuous node attributes. In this work, we focus on Gaussian process regression, for which we introduce the Sliced Wasserstein Weisfeiler-Lehman (SWWL) graph kernel. In contrast to existing graph kernels, the proposed SWWL kernel enjoys positive definiteness and a drastic complexity reduction, which makes it possible to process datasets that were previously impossible to handle. The new kernel is first validated on graph classification for molecular datasets, where the input graphs have a few tens of nodes. The efficiency of the SWWL kernel is then illustrated on graph regression in computational fluid dynamics and solid mechanics, where the input graphs are made up of tens of thousands of nodes.
title Gaussian process regression with Sliced Wasserstein Weisfeiler-Lehman graph kernels
topic Machine Learning
url https://arxiv.org/abs/2402.03838