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Main Authors: D'Inverno, Giuseppe Alessio, Ajavon, Kylian, Brugiapaglia, Simone
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2502.06595
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author D'Inverno, Giuseppe Alessio
Ajavon, Kylian
Brugiapaglia, Simone
author_facet D'Inverno, Giuseppe Alessio
Ajavon, Kylian
Brugiapaglia, Simone
contents Diffusion kernels over graphs have been widely utilized as effective tools in various applications due to their ability to accurately model the flow of information through nodes and edges. However, there is a notable gap in the literature regarding the development of surrogate models for diffusion processes on graphs. In this work, we fill this gap by proposing sparse polynomial-based surrogate models for parametric diffusion equations on graphs with community structure. In tandem, we provide convergence guarantees for both least squares and compressed sensing-based approximations by showing the holomorphic regularity of parametric solutions to these diffusion equations. Our theoretical findings are accompanied by a series of numerical experiments conducted on both synthetic and real-world graphs that demonstrate the applicability of our methodology.
format Preprint
id arxiv_https___arxiv_org_abs_2502_06595
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Surrogate models for diffusion on graphs via sparse polynomials
D'Inverno, Giuseppe Alessio
Ajavon, Kylian
Brugiapaglia, Simone
Numerical Analysis
Machine Learning
34B45, 41A10, 41A63, 65D40
Diffusion kernels over graphs have been widely utilized as effective tools in various applications due to their ability to accurately model the flow of information through nodes and edges. However, there is a notable gap in the literature regarding the development of surrogate models for diffusion processes on graphs. In this work, we fill this gap by proposing sparse polynomial-based surrogate models for parametric diffusion equations on graphs with community structure. In tandem, we provide convergence guarantees for both least squares and compressed sensing-based approximations by showing the holomorphic regularity of parametric solutions to these diffusion equations. Our theoretical findings are accompanied by a series of numerical experiments conducted on both synthetic and real-world graphs that demonstrate the applicability of our methodology.
title Surrogate models for diffusion on graphs via sparse polynomials
topic Numerical Analysis
Machine Learning
34B45, 41A10, 41A63, 65D40
url https://arxiv.org/abs/2502.06595