A nonlinear repair technique for the MPFA-D scheme in single-phase flow problems and heterogeneous and anisotropic media
From MaRDI portal
Publication:6126545
DOI10.1016/j.jcp.2024.112759OpenAlexW4391069718MaRDI QIDQ6126545
Michael G. Edwards, Darlan K. E. de Carvalho, Fernando Raul Licapa Contreras, Artur Castiel Reis de Souza, Paulo R. M. Lyra, Túlio de Moura Cavalcante
Publication date: 9 April 2024
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jcp.2024.112759
unstructured meshesdiscrete maximum principle (DMP)heterogeneous and anisotropic mediaflux limited splitting (FLS)non-linear repair technique
Basic methods in fluid mechanics (76Mxx) Numerical methods for partial differential equations, boundary value problems (65Nxx) Flows in porous media; filtration; seepage (76Sxx)
Cites Work
- Unnamed Item
- Unnamed Item
- A small stencil and extremum-preserving scheme for anisotropic diffusion problems on arbitrary 2D and 3D meshes
- Interpolation-based second-order monotone finite volume schemes for anisotropic diffusion equations on general grids
- Monotone corrections for generic cell-centered finite volume approximations of anisotropic diffusion equations
- A family of MPFA finite-volume schemes with full pressure support for the general tensor pressure equation on cell-centered triangular grids
- A second order in space combination of methods verifying a maximum principle for the discretization of diffusion operators
- Monotone finite volume schemes for diffusion equations on polygonal meshes
- A quasi-positive family of continuous Darcy-flux finite-volume schemes with full pressure support
- A constrained finite element method satisfying the discrete maximum principle for anisotropic diffusion problems
- Finite volume discretization with imposed flux continuity for the general tensor pressure equation
- Discretisation and multigrid solution of elliptic equations with mixed derivative terms and strongly discontinuous coefficients
- A cell-centered multipoint flux approximation method with a diamond stencil coupled with a higher order finite volume method for the simulation of oil-water displacements in heterogeneous and anisotropic petroleum reservoirs
- Cell-centered nonlinear finite-volume methods for the heterogeneous anisotropic diffusion problem
- Unstructured, control-volume distributed, full-tensor finite volume schemes with flow based grids
- M-matrix flux splitting for general full tensor discretization operators on structured and unstructured grids
- A non-linear finite volume method coupled with a modified higher order MUSCL-type method for the numerical simulation of two-phase flows in non-homogeneous and non-isotropic oil reservoirs
- A multipoint flux approximation with a diamond stencil and a non-linear defect correction strategy for the numerical solution of steady state diffusion problems in heterogeneous and anisotropic media satisfying the discrete maximum principle
- A nonlinear correction scheme for the heterogeneous and anisotropic diffusion problems on polygonal meshes
- A new multipoint flux approximation method with a quasi-local stencil (MPFA-QL) for the simulation of diffusion problems in anisotropic and heterogeneous media
- A new nonlinear finite volume scheme preserving positivity for diffusion equations
- A cell-centered nonlinear finite volume scheme preserving fully positivity for diffusion equation
- Monotone finite volume schemes for diffusion equations on unstructured triangular and shape-regular polygonal meshes
- Enriched multi-point flux approximation for general grids
- Finite volume monotone scheme for highly anisotropic diffusion operators on unstructured triangular meshes. (Schéma volumes finis monotone pour des opérateurs de diffusion fortement anisotropes sur des maillages de triangles non structurés).
- Double-families of quasi-positive Darcy-flux approximations with highly anisotropic tensors on structured and unstructured grids
- Multiscale Finite-Volume CVD-MPFA Formulations on Structured and Unstructured Grids
- A linearity-preserving cell-centered scheme for the heterogeneous and anisotropic diffusion equations on general meshes
- Non-linear flux-splitting schemes with imposed discrete maximum principle for elliptic equations with highly anisotropic coefficients
- Some results on the accuracy of an edge-based finite volume formulation for the solution of elliptic problems in non-homogeneous and non-isotropic media
- A node-centred finite volume formulation for the solution of two-phase flows in non-homogeneous porous media
- A compact multipoint flux approximation method with improved robustness
- Discretization on Unstructured Grids For Inhomogeneous, Anisotropic Media. Part II: Discussion And Numerical Results
- Iterative Solution Methods
- On the accuracy of a nonlinear finite volume method for the solution of diffusion problems using different interpolations strategies
- Monotone and Oscillation Matrices Applied to Finite Difference Approximations
- Matrix Iterative Analysis
This page was built for publication: A nonlinear repair technique for the MPFA-D scheme in single-phase flow problems and heterogeneous and anisotropic media
