Numerical analysis of the coupling of free fluid with a poroelastic material
From MaRDI portal
Publication:6071657
DOI10.1002/num.22437OpenAlexW2985943494WikidataQ126817863 ScholiaQ126817863MaRDI QIDQ6071657
Aycil Cesmelioglu, Prince Chidyagwai
Publication date: 28 November 2023
Published in: Numerical Methods for Partial Differential Equations (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1002/num.22437
Related Items (4)
A posteriori error estimates for a nonconforming finite element discretization of the Stokes-Biot system ⋮ A mixed elasticity formulation for fluid–poroelastic structure interaction ⋮ A posteriori error analysis for a Lagrange multiplier method for a Stokes/Biot fluid-poroelastic structure interaction model ⋮ A hybridizable discontinuous Galerkin method for the fully coupled time-dependent Stokes/Darcy-transport problem
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Analysis of a discontinuous finite element method for the coupled Stokes and Darcy problems
- Stabilization of explicit coupling in fluid-structure interaction involving fluid incompressibility
- On a coupled discontinuous/continuous Galerkin framework and an adaptive penalty scheme for poroelasticity problems
- Overcoming the problem of locking in linear elasticity and poroelasticity: an heuristic approach
- Coupling Biot and Navier-Stokes equations for modelling fluid-poroelastic media interaction
- Coupled Stokes-Darcy model with Beavers-Joseph interface boundary condition
- A fully coupled 3-D mixed finite element model of Biot consolidation
- A strongly conservative finite element method for the coupling of Stokes and Darcy flow
- A stable finite element for the Stokes equations
- Improved accuracy in finite element analysis of Biot's consolidation problem
- A numerical solution of the Navier-Stokes equations using the finite element technique
- A Lagrange multiplier method for a Stokes-Biot fluid-poroelastic structure interaction model
- A strongly conservative hybrid DG/mixed FEM for the coupling of Stokes and Darcy flow
- Coupling multipoint flux mixed finite element methods with continuous Galerkin methods for poroelasticity
- Weak Galerkin method for the Biot's consolidation model
- Partitioning strategies for the interaction of a fluid with a poroelastic material based on a Nitsche's coupling approach
- Analysis of the coupled Navier-Stokes/Biot problem
- A finite difference analysis of Biot's consolidation model
- Convergence of IPDG for coupled time-dependent Navier-Stokes and Darcy equations
- Stabilized mixed finite element formulations for materially nonlinear partially saturated two-phase media
- A computational method for approximating a Darcy-Stokes system governing a vuggy porous medium
- A unified stabilized method for Stokes' and Darcy's equations
- Added-mass effect in the design of partitioned algorithms for fluid--structure problems
- Error-bounds for finite element method
- Stability and monotonicity for some discretizations of the Biot's consolidation model
- A coupling of mixed and continuous Galerkin finite element methods for poroelasticity. I: The continuous in time case
- Time-dependent coupling of Navier–Stokes and Darcy flows
- A new mixed finite element method for poro-elasticity
- Convergence of a family of Galerkin discretizations for the Stokes-Darcy coupled problem
- Theory of Elasticity and Consolidation for a Porous Anisotropic Solid
- An operator splitting approach for the interaction between a fluid and a multilayered poroelastic structure
- Analysis of partitioned methods for the <scp>B</scp>iot System
- A Two-Grid Method of a Mixed Stokes–Darcy Model for Coupling Fluid Flow with Porous Media Flow
- Decoupled schemes for a non-stationary mixed Stokes-Darcy model
- Numerical stabilization of Biot's consolidation model by a perturbation on the flow equation
- Gmsh: A 3-D finite element mesh generator with built-in pre- and post-processing facilities
- Finite Element Methods for Navier-Stokes Equations
- An accuracy condition for consolidation by finite elements
- On stability and convergence of finite element approximations of Biot's consolidation problem
- Coupling Fluid Flow with Porous Media Flow
- Analysis of a domain decomposition method for the coupling of Stokes and Darcy equations
- On The Interface Boundary Condition of Beavers, Joseph, and Saffman
- Optimization-Based Decoupling Algorithms for a Fluid-Poroelastic System
- Locally Conservative Coupling of Stokes and Darcy Flows
- Asymptotic Behavior of Semidiscrete Finite-Element Approximations of Biot’s Consolidation Problem
- Splitting Methods Based on Algebraic Factorization for Fluid-Structure Interaction
- Micromechanical computational modeling of secondary consolidation and hereditary creep in soils.
This page was built for publication: Numerical analysis of the coupling of free fluid with a poroelastic material
