In this article, we develop a nonconforming mixed finite element method to solve Biot\u27s consolidation model. In particular, this work has been motivated to overcome nonphysical oscillations in the pressure variable, which is known as locking in poroelasticity. The method is based on a coupling of a nonconforming finite element method for the displacement of the solid phase with a standard mixed finite element method for the pressure and velocity of the fluid phase. The discrete Korn\u27s inequality has been achieved by adding a jump term to the discrete variational formulation. We prove a rigorous proof of a‐priori error estimates for both semidiscrete and fully‐discrete schemes. Optimal error estimates have been derived. In particular, ...
The solution to Biot's coupled consolidation theory is usually addressed by the Finite Element (FE) ...
We present an a priori and a posteriori error analysis of a conforming finite element method for a f...
In this work, we consider the popular P1–RT0–P0 discretization of the three-field formulation of Bio...
A stable finite element scheme that avoids pressure oscillations for a three-field Biot’s model in p...
We study the a priori error analysis of finite element methods for Biot’s consolidation model. We co...
We propose a new formulation along with a family of finite element schemes for the approximation of ...
We discuss the construction of robust preconditioners for finite element approximations of Biot’s co...
In this thesis, we explore the solution methods for the linear system resulting from a mixed finite ...
This paper is concerned with the analysis of coupled mixed finite element methods applied to the Bio...
In this Thesis, we explore the solution methods for the linear system resulting from a mixed finite ...
The numerical solution to the Biot equations of 3-D consolidation is still a challenging task becaus...
A novel algorithm for the three-field formulation of Biot’s consolidation model based on mixed and d...
Biot's consolidation model in poroelasticity has a number of applications in science, medicine, and ...
The consolidation theory was developed in a three-dimensional (3D) setting by Biot, giving rise to a...
In this work, we consider two discretizations of the three-field formulation of Biot’s consolidation...
The solution to Biot's coupled consolidation theory is usually addressed by the Finite Element (FE) ...
We present an a priori and a posteriori error analysis of a conforming finite element method for a f...
In this work, we consider the popular P1–RT0–P0 discretization of the three-field formulation of Bio...
A stable finite element scheme that avoids pressure oscillations for a three-field Biot’s model in p...
We study the a priori error analysis of finite element methods for Biot’s consolidation model. We co...
We propose a new formulation along with a family of finite element schemes for the approximation of ...
We discuss the construction of robust preconditioners for finite element approximations of Biot’s co...
In this thesis, we explore the solution methods for the linear system resulting from a mixed finite ...
This paper is concerned with the analysis of coupled mixed finite element methods applied to the Bio...
In this Thesis, we explore the solution methods for the linear system resulting from a mixed finite ...
The numerical solution to the Biot equations of 3-D consolidation is still a challenging task becaus...
A novel algorithm for the three-field formulation of Biot’s consolidation model based on mixed and d...
Biot's consolidation model in poroelasticity has a number of applications in science, medicine, and ...
The consolidation theory was developed in a three-dimensional (3D) setting by Biot, giving rise to a...
In this work, we consider two discretizations of the three-field formulation of Biot’s consolidation...
The solution to Biot's coupled consolidation theory is usually addressed by the Finite Element (FE) ...
We present an a priori and a posteriori error analysis of a conforming finite element method for a f...
In this work, we consider the popular P1–RT0–P0 discretization of the three-field formulation of Bio...