In this paper we present an accurate stabilized FIC-FEM formulation for the multidimensional steady-state advection-diffusion-absorption equation. The stabilized formulation is based on the Galerkin FEM solution of the governing differential equations derived via the Finite Increment Calculus (FIC) method using two stabilization parameters. The value of the two stabilization parameters ensuring an accurate nodal FEM solution using uniform meshes of linear elements is obtained from the optimal values for the 1D problem. The accuracy of the new FIC-FEM formulation is demonstrated in the solution of 2D steadystate advection-diffusion-absorption problems for a range of physical parameters and boundary conditions
We develop two new stabilized methods for the steady advection-diffusion-reaction equation, referred...
A finite element method (FEM) for steady-state convective-diffusive problems presenting sharp gradie...
In this paper the FIC method is used as the basis for a new “alpha-adaptive” procedure (...
In this paper we present an accurate stabilized FIC-FEM formulation for the multidimensional steady-...
In this paper we present an accurate stabilized FIC-FEM formulation for the 1D advection-diffusion-r...
A stabilized finite element method (FEM) for the multidimensional steady state advection-diffusion-a...
In this paper we present an accurate stabilized FIC-FEM formulation for the 1D advection-diffusion-r...
A stabilized finite element method (FEM) for the multidimensional steady state advection-diffusion-a...
A stabilized finite element method (FEM) for the multidimensional steady state advection-diffusion-a...
In this paper we present a stabilized FIC–FEM formulation for the multidimensional transient advecti...
The accurate solution of convection type problems on practical grids has been ever a challenging iss...
For residual-based stabilization methods such as streamline-upwind Petrov–Galerkin (SUPG) and ...
We give a brief overview of stabilized finite element methods and illustrate the developments appli...
We present a formulation for analysis of turbulent incompressible flows using a stabilized finite el...
A stabilized finite element formulation for incompressible viscous flows is derived. The starting po...
We develop two new stabilized methods for the steady advection-diffusion-reaction equation, referred...
A finite element method (FEM) for steady-state convective-diffusive problems presenting sharp gradie...
In this paper the FIC method is used as the basis for a new “alpha-adaptive” procedure (...
In this paper we present an accurate stabilized FIC-FEM formulation for the multidimensional steady-...
In this paper we present an accurate stabilized FIC-FEM formulation for the 1D advection-diffusion-r...
A stabilized finite element method (FEM) for the multidimensional steady state advection-diffusion-a...
In this paper we present an accurate stabilized FIC-FEM formulation for the 1D advection-diffusion-r...
A stabilized finite element method (FEM) for the multidimensional steady state advection-diffusion-a...
A stabilized finite element method (FEM) for the multidimensional steady state advection-diffusion-a...
In this paper we present a stabilized FIC–FEM formulation for the multidimensional transient advecti...
The accurate solution of convection type problems on practical grids has been ever a challenging iss...
For residual-based stabilization methods such as streamline-upwind Petrov–Galerkin (SUPG) and ...
We give a brief overview of stabilized finite element methods and illustrate the developments appli...
We present a formulation for analysis of turbulent incompressible flows using a stabilized finite el...
A stabilized finite element formulation for incompressible viscous flows is derived. The starting po...
We develop two new stabilized methods for the steady advection-diffusion-reaction equation, referred...
A finite element method (FEM) for steady-state convective-diffusive problems presenting sharp gradie...
In this paper the FIC method is used as the basis for a new “alpha-adaptive” procedure (...