The method of fundamental solutions (MFS) is developed for solving numerically the Brinkman flow in the porous medium outside obstacles of known or unknown shapes. The MFS uses the fundamental solution of the Brinkman equation as in the boundary element method (BEM), but the single-layer representation is desingularized by moving the boundary sources to fictitious points outside the solution domain. In the case of unbounded flow past obstacles, these source points are placed in the domain inside the obstacle on a contracted fictitious pseudo-boundary. When the obstacle is known, then the fluid flow in porous media problem is direct, linear and well-posed. In the case of Brinkman flow in the porous medium outside an infinitely long circular ...
The Brinkman equations model fluid flow through porous media and are particularly interesting in reg...
We use low order approximations, piecewise linear, continuous velocities and piecewise constant pres...
This thesis deals with the study of certain flow and stability problems in porous media using some n...
In part I, we considered the application of the method of fundamental solutions (MFS) for solving nu...
From the steady Stokes and Navier-Stokes models, a penalization method has been considered by severa...
The fundamental solution or Green's function for flow in porous media is determined using Stokesian...
Typical industrial and biological flows often occur in complicated domains that are either infeasibl...
© 2017 Elsevier Ltd The problem of viscous incompressible flow in a periodic cell with a porous body...
The stability of fluid flow in a horizontal layer of Brinkman porous medium with fluid viscosity dif...
This paper presents a pressure-robust enriched Galerkin (EG) method for the Brinkman equations with ...
© 2019, Springer Nature B.V. The two key parameters of the Brinkman’s model for fluid flow in porous...
The stability of fluid flow in a horizontal layer of Brinkman porous medium with fluid viscosity dif...
The problem of viscous incompressible flow in a periodic cell with a porous body is solved. The Stok...
We propose and analyze a fully-mixed finite element method to numerically approximate the flow patte...
Em escoamentos em meios porosos, especialmente os provenientes de problemas de extração de petróleo,...
The Brinkman equations model fluid flow through porous media and are particularly interesting in reg...
We use low order approximations, piecewise linear, continuous velocities and piecewise constant pres...
This thesis deals with the study of certain flow and stability problems in porous media using some n...
In part I, we considered the application of the method of fundamental solutions (MFS) for solving nu...
From the steady Stokes and Navier-Stokes models, a penalization method has been considered by severa...
The fundamental solution or Green's function for flow in porous media is determined using Stokesian...
Typical industrial and biological flows often occur in complicated domains that are either infeasibl...
© 2017 Elsevier Ltd The problem of viscous incompressible flow in a periodic cell with a porous body...
The stability of fluid flow in a horizontal layer of Brinkman porous medium with fluid viscosity dif...
This paper presents a pressure-robust enriched Galerkin (EG) method for the Brinkman equations with ...
© 2019, Springer Nature B.V. The two key parameters of the Brinkman’s model for fluid flow in porous...
The stability of fluid flow in a horizontal layer of Brinkman porous medium with fluid viscosity dif...
The problem of viscous incompressible flow in a periodic cell with a porous body is solved. The Stok...
We propose and analyze a fully-mixed finite element method to numerically approximate the flow patte...
Em escoamentos em meios porosos, especialmente os provenientes de problemas de extração de petróleo,...
The Brinkman equations model fluid flow through porous media and are particularly interesting in reg...
We use low order approximations, piecewise linear, continuous velocities and piecewise constant pres...
This thesis deals with the study of certain flow and stability problems in porous media using some n...