Enhanced spatial modeling on linear networks using Gaussian Whittle-Matérn fields
Enhanced spatial modeling on linear networks using Gaussian Whittle-Matérn fields
Spatial statistics is traditionally based on stationary models on
like Matérn fields. The adaptation of traditional spatial statistical methods, originally designed for stationary models in Euclidean spaces, to effectively model phenomena on linear networks such as stream systems and urban road networks is challenging. The current study aims to analyze the incidence of traffic accidents on road networks using three different methodologies and compare the model performance for each methodology. Initially, we analyzed the application of spatial triangulation precisely on road networks instead of traditional continuous regions. However, this approach posed challenges in areas with complex boundaries, leading to the emergence of artificial spatial dependencies. To address this, we applied an alternative computational method to construct nonstationary barrier models. Finally, we explored a recently proposed class of Gaussian processes on compact metric graphs, the Whittle-Matérn fields, defined by a fractional SPDE on the metric graph. The latter fields are a natural extension of Gaussian fields with Matérn covariance functions on Euclidean domains to non-Euclidean metric graph settings. A ten-year period (2010–2019) of daily traffic-accident records from Barcelona, Spain have been used to evaluate the three models referred above. While comparing model performance we observed that the Whittle-Matérn fields defined directly on the network outperformed the network triangulation and barrier models. Due to their flexibility, the Whittle-Matérn fields can be applied to a wide range of environmental problems on linear networks and more general metric graphs such as modeling of water contamination in stream networks or modeling air quality or accidents on urban road networks.
Environmental processes, INLA, Linear networks, Matérn covariance, SPDE, Whittle-Matérn fields
1143-1158
Chaudhuri, Somnath
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Barceló, Maria A.
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Juan, Pablo
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Varga, Diego
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Bolin, David
5a44dfc0-cfb1-4eed-8377-7fd43194a820
Rue, Håvard
9dfc71eb-bf1d-4edb-9489-f8bd66c41de7
Saez, Marc
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March 2025
Chaudhuri, Somnath
ae0507e0-f920-4438-bc9f-ecdd5ac8967a
Barceló, Maria A.
48f806cd-82c9-4ab6-bd8f-11db0e447f48
Juan, Pablo
f3648398-5752-4dd0-9410-835566b659f4
Varga, Diego
4df07421-a6e6-4a0b-b87f-7187d83c91e7
Bolin, David
5a44dfc0-cfb1-4eed-8377-7fd43194a820
Rue, Håvard
9dfc71eb-bf1d-4edb-9489-f8bd66c41de7
Saez, Marc
8e1a1aa0-d45d-4a7a-8de8-1ac0f8561c51
Chaudhuri, Somnath, Barceló, Maria A., Juan, Pablo, Varga, Diego, Bolin, David, Rue, Håvard and Saez, Marc
(2025)
Enhanced spatial modeling on linear networks using Gaussian Whittle-Matérn fields.
Stochastic Environmental Research and Risk Assessment, 39 (3), .
(doi:10.1007/s00477-025-02912-6).
Abstract
Spatial statistics is traditionally based on stationary models on
like Matérn fields. The adaptation of traditional spatial statistical methods, originally designed for stationary models in Euclidean spaces, to effectively model phenomena on linear networks such as stream systems and urban road networks is challenging. The current study aims to analyze the incidence of traffic accidents on road networks using three different methodologies and compare the model performance for each methodology. Initially, we analyzed the application of spatial triangulation precisely on road networks instead of traditional continuous regions. However, this approach posed challenges in areas with complex boundaries, leading to the emergence of artificial spatial dependencies. To address this, we applied an alternative computational method to construct nonstationary barrier models. Finally, we explored a recently proposed class of Gaussian processes on compact metric graphs, the Whittle-Matérn fields, defined by a fractional SPDE on the metric graph. The latter fields are a natural extension of Gaussian fields with Matérn covariance functions on Euclidean domains to non-Euclidean metric graph settings. A ten-year period (2010–2019) of daily traffic-accident records from Barcelona, Spain have been used to evaluate the three models referred above. While comparing model performance we observed that the Whittle-Matérn fields defined directly on the network outperformed the network triangulation and barrier models. Due to their flexibility, the Whittle-Matérn fields can be applied to a wide range of environmental problems on linear networks and more general metric graphs such as modeling of water contamination in stream networks or modeling air quality or accidents on urban road networks.
Text
s00477-025-02912-6
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More information
Accepted/In Press date: 9 January 2025
e-pub ahead of print date: 29 January 2025
Published date: March 2025
Keywords:
Environmental processes, INLA, Linear networks, Matérn covariance, SPDE, Whittle-Matérn fields
Identifiers
Local EPrints ID: 503040
URI: http://eprints.soton.ac.uk/id/eprint/503040
ISSN: 1436-3240
PURE UUID: 138f12fa-0243-4c2a-b695-9f0bd2c90aba
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Date deposited: 17 Jul 2025 16:47
Last modified: 22 Aug 2025 02:43
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Contributors
Author:
Somnath Chaudhuri
Author:
Maria A. Barceló
Author:
Pablo Juan
Author:
Diego Varga
Author:
David Bolin
Author:
Håvard Rue
Author:
Marc Saez
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