W
Wietse M. Boon
Researcher at Royal Institute of Technology
Publications - 36
Citations - 709
Wietse M. Boon is an academic researcher from Royal Institute of Technology. The author has contributed to research in topics: Finite element method & Discretization. The author has an hindex of 10, co-authored 29 publications receiving 482 citations. Previous affiliations of Wietse M. Boon include University of Stuttgart & University of Bergen.
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Journal ArticleDOI
Benchmarks for single-phase flow in fractured porous media
Bernd Flemisch,Inga Berre,Wietse M. Boon,Alessio Fumagalli,Nicolas Schwenck,Anna Scotti,Ivar Stefansson,Alexandru Tatomir +7 more
TL;DR: Several test cases intended to be benchmarks for numerical schemes for single-phase fluid flow in fractured porous media are presented, including a vertex and two cell-centred finite volume methods, a non-conforming embedded discrete fracture model, a primal and a dual extended finite element formulation, and a mortar discrete fractures model.
Journal ArticleDOI
Robust Discretization of Flow in Fractured Porous Media
TL;DR: This formulation is novel in that it employs the normal fluxes as the mortar variable within the mixed finite element framework, resulting in a formulation that couples the flow in the fractures with the surrounding domain with a strong notion of mass conservation.
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Verification benchmarks for single-phase flow in three-dimensional fractured porous media
Inga Berre,Wietse M. Boon,Bernd Flemisch,Alessio Fumagalli,Alessio Fumagalli,Dennis Gläser,Eirik Keilegavlen,Anna Scotti,Ivar Stefansson,Alexandru Tatomir,Alexandru Tatomir,Konstantin Brenner,Samuel Burbulla,Philippe R.B. Devloo,Omar Durán,Marco Favino,Julian Hennicker,I-Hsien Lee,Konstantin Lipnikov,Roland Masson,Klaus Mosthaf,Maria Giuseppina Chiara Nestola,Chuen Fa Ni,Kirill Nikitin,Philipp Schädle,Daniil Svyatskiy,Ruslan M. Yanbarisov,Patrick Zulian +27 more
TL;DR: The underlying mathematical model, an overview of the features of the participating numerical methods, and their performance in solving the benchmark cases for single-phase flow in three-dimensional fractured porous media are presented.
Journal ArticleDOI
Unified approach to discretization of flow in fractured porous media
Jan Martin Nordbotten,Jan Martin Nordbotten,Wietse M. Boon,Alessio Fumagalli,Eirik Keilegavlen +4 more
TL;DR: A mortar-based approach to discretizing flow in fractured porous media, which is agnostic to the discretizations used to discrete the fluid flow equations in the porous medium and in the fractures, and represents a unified approach to integrated fractured geometries into any existing discretization framework.
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Functional Analysis and Exterior Calculus on Mixed-Dimensional Geometries
TL;DR: In this article, a semi-discrete differential operator coupling manifolds of different dimensions is introduced, and the authors define the mixed-dimensional minimization problem corresponding to the Hodge Laplacian.