The interaction between a fluid and a poroelastic structure is a complex problem that couples the Navier-Stokes equations for the fluid with the Biot system for the structure. The finite element approximation of this problem is involved due to the fact that both subproblems are indefinite. In this work, we design residual-based stabilization techniques for the Biot system, that have been motivated using the variational multiscale approach. Then, we state the monolithic Navier-Stokes/Biot system with the appropriate transmission conditions on the interface. We consider both monolithic solvers and heterogeneous domain decomposition strategies. Different domain decomposition methods are used and their convergence has been analyzed for a simpli...
In this paper, we present a multigrid method with problem-dependent prolongation and restriction for...
The interaction between fluid flow and a deformable porous medium is a complicated multi-physics pro...
In this paper, we present problem–dependent prolongation and problem–dependent restriction for a mul...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
Abstract. The interaction between a free fluid and a deformable porous medium is found in a wide ran...
The thesis focuses on the analysis and simulation of fluid–poroelastic structure interaction (FPSI),...
In this thesis, the coupling of the Stokes equations and the Biot poroelasticity equations for fluid...
We study a finite element computational model for solving the coupled problem arising in the interac...
In this work, we are interested in efficiently solving the quasi‐static, linear Biot model for poroe...
This work utilizes numerical models to investigate the importance of poroelasticity in Fluid- Struct...
We introduce and analyze a partially augmented fully-mixed formulation and a mixed finite element me...
In this work, we are interested in efficiently solving the quasi-static, linear Biot model for poroe...
This thesis focuses on the development of mixed finite element methods for the coupled problem arisi...
The focus of this thesis is on finite element computational models for solving the coupled problem a...
In this paper, we present a multigrid method with problem-dependent prolongation and restriction for...
The interaction between fluid flow and a deformable porous medium is a complicated multi-physics pro...
In this paper, we present problem–dependent prolongation and problem–dependent restriction for a mul...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
Abstract. The interaction between a free fluid and a deformable porous medium is found in a wide ran...
The thesis focuses on the analysis and simulation of fluid–poroelastic structure interaction (FPSI),...
In this thesis, the coupling of the Stokes equations and the Biot poroelasticity equations for fluid...
We study a finite element computational model for solving the coupled problem arising in the interac...
In this work, we are interested in efficiently solving the quasi‐static, linear Biot model for poroe...
This work utilizes numerical models to investigate the importance of poroelasticity in Fluid- Struct...
We introduce and analyze a partially augmented fully-mixed formulation and a mixed finite element me...
In this work, we are interested in efficiently solving the quasi-static, linear Biot model for poroe...
This thesis focuses on the development of mixed finite element methods for the coupled problem arisi...
The focus of this thesis is on finite element computational models for solving the coupled problem a...
In this paper, we present a multigrid method with problem-dependent prolongation and restriction for...
The interaction between fluid flow and a deformable porous medium is a complicated multi-physics pro...
In this paper, we present problem–dependent prolongation and problem–dependent restriction for a mul...