Modeling flow and deformation in porous media from pore-scale to the Darcy-scale
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Publication:6568877
DOI10.1016/J.RINAM.2024.100448zbMATH Open1544.76107MaRDI QIDQ6568877
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Publication date: 8 July 2024
Published in: Results in Applied Mathematics (Search for Journal in Brave)
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Cites Work
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- Analysis of nonlinear poro-elastic and poro-visco-elastic models
- Homogenization of nonstationary Navier-Stokes equations in a domain with a grained boundary
- Diffusion in poro-elastic media
- Pore-to-core simulations of flow with large velocities using continuum models and imaging data
- Hybrid three-scale model for evolving pore-scale geometries
- The role of structural viscoelasticity in deformable porous media with incompressible constituents: applications in biomechanics
- Recent advances in the Marker and Cell Method
- Coupled flow and biomass-nutrient growth at pore-scale with permeable biofilm, adaptive singularity and multiple species
- Robust error analysis of coupled mixed methods for Biot's consolidation model
- Homogenization of Stokes equations in perforated domains: a unified approach
- Homogenization and porous media
- Modeling groundwater flow and contaminant transport
- Thermoporoelasticity via homogenization: modeling and formal two-scale expansions
- Poromechanics of freezing materials
- A coupling of mixed and continuous Galerkin finite element methods for poroelasticity. II: The discrete-in-time case
- Multiscale coupled models for complex media: from analysis to simulation in geophysics and medicine. Abstracts from the workshop held January 23--29, 2022
- Multiscale investigation of shear bands in sand: physical and numerical experiments
- A finite element analysis of multiphase immiscible flow in deforming porous media for subsurface systems
- On stability and convergence of finite element approximations of Biot's consolidation problem
- Poro-Visco-Elastic Compaction in Sedimentary Basins
- Mixed Finite Element Methods and Applications
- Mathematical theory of nonlinear single-phase poroelasticity
- Locking-free and locally-conservative enriched Galerkin method for poroelasticity
- Twofold Saddle-Point Formulation of Biot Poroelasticity with Stress-Dependent Diffusion
- Robust conservative scheme and nonlinear solver for phase transitions in heterogeneous permafrost
- Iteratively coupled mixed finite element solver for thermo-hydro-mechanical modeling of permafrost thaw
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