In this paper we propose a finite volume discretization for the threedimensional Biot poroelasticity system in multilayered domains. For the stability reasons, staggered grids are used. The discretization accounts for discontinuity of the coefficients across the interfaces between layers with different physical properties. Numerical experiments, based on the proposed discretization showed second order convergence in the maximum norm for the primary as well as flux unknowns of the system. A certain application example is presented as well
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
In this paper we discuss a new discretization for the Biot equations. The discretization treats the ...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
In this paper, we present a multigrid method with problem-dependent prolongation and restriction for...
In this paper, we present problem–dependent prolongation and problem–dependent restriction for a mul...
Finite volume discretization of Biot system of poroelasticity in a multilayered domain is presented....
In soil mechanics assumption of only vertical subsidence is often invoked and this leads to the one-...
Thesis (Ph.D.)--University of Washington, 2013Poroelasticity theory models the mechanics of porous, ...
In this work, we are interested in efficiently solving the quasi‐static, linear Biot model for poroe...
In this work, we consider the popular P1–RT0–P0 discretization of the three-field formulation of Bio...
Abstract. Poroelasticity theory models the dynamics of porous, fluid-saturated media. It was pioneer...
We develop a mixed finite element domain decomposition method on non-matching grids for the Biot sys...
Poroelastic models deal with the coupling of changes in stress and fluid pressure in some porous med...
Poroelastic models deal with the coupling of changes in stress and fluid pressure in some porous med...
Finite difference discretizations of 1D poroelasticity equations with discontinuous coefficients ar...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
In this paper we discuss a new discretization for the Biot equations. The discretization treats the ...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
In this paper, we present a multigrid method with problem-dependent prolongation and restriction for...
In this paper, we present problem–dependent prolongation and problem–dependent restriction for a mul...
Finite volume discretization of Biot system of poroelasticity in a multilayered domain is presented....
In soil mechanics assumption of only vertical subsidence is often invoked and this leads to the one-...
Thesis (Ph.D.)--University of Washington, 2013Poroelasticity theory models the mechanics of porous, ...
In this work, we are interested in efficiently solving the quasi‐static, linear Biot model for poroe...
In this work, we consider the popular P1–RT0–P0 discretization of the three-field formulation of Bio...
Abstract. Poroelasticity theory models the dynamics of porous, fluid-saturated media. It was pioneer...
We develop a mixed finite element domain decomposition method on non-matching grids for the Biot sys...
Poroelastic models deal with the coupling of changes in stress and fluid pressure in some porous med...
Poroelastic models deal with the coupling of changes in stress and fluid pressure in some porous med...
Finite difference discretizations of 1D poroelasticity equations with discontinuous coefficients ar...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...
In this paper we discuss a new discretization for the Biot equations. The discretization treats the ...
The interaction between a fluid and a poroelastic structure is a complex problem that couples the Na...