In this paper we study one-dimensional three-phase flow through porous media of immiscible, incompressible fluids. The model uses the common multiphase flow extension of Darcy's equation, and does not include gravity and capillarity effects. Under these conditions, the mathematical problem reduces to a 2 x 2 system of conservation laws whose essential features are: (1) the system is strictly hyperbolic; (2) both characteristic fields are nongenuinely nonlinear, with single, connected inflection loci. These properties, which are natural extensions of the two-phase flow model, ensure that the solution is physically sensible. We present the complete analytical solution to the Riemann problem (constant initial and injected states) in ...
In the first part of thesis we deal with two-phase multicomponent, partially miscible, compressible ...
The multiphase Darcy model used to represent two-phase immiscible displacement flow within porous me...
International audienceThe paper is devoted to the computation of two-phase flows in a porous medium ...
We study the Riemann problem for a model of three-phase fluid flow: liquid, vapor and a mixture of t...
International audienceWe present here a three-fluid three-pressure model to describe three-field pat...
We study the character of the equations in the traditional formulation of one-dimensional immiscible...
International audienceWe present here a three-fluid three-pressure model to describe three-field pat...
Numerical methods are necessary, and are extremely important, in developing an understanding of the ...
In this article we present a new numerical procedure for solving exactly the Riemann problem of comp...
Neste trabalho obtivemos uma solução do problema de Riemann associado a um sistema de duas leis de ...
Abstract: . For the system of equations of two-component, two-phase filtration, which in f...
We propose a 2 × 2 hyperbolic system of conservation laws to model the dynamics of two incompressibl...
Immiscible three-phase flow in a rigid porous medium is upscaled from the pore to the continuum (Dar...
Immiscible three-phase flow in a rigid porous medium is upscaled from the pore to the continuum (Dar...
We propose a 2 × 2 hyperbolic system of conservation laws to model the dynamics of two incompressibl...
In the first part of thesis we deal with two-phase multicomponent, partially miscible, compressible ...
The multiphase Darcy model used to represent two-phase immiscible displacement flow within porous me...
International audienceThe paper is devoted to the computation of two-phase flows in a porous medium ...
We study the Riemann problem for a model of three-phase fluid flow: liquid, vapor and a mixture of t...
International audienceWe present here a three-fluid three-pressure model to describe three-field pat...
We study the character of the equations in the traditional formulation of one-dimensional immiscible...
International audienceWe present here a three-fluid three-pressure model to describe three-field pat...
Numerical methods are necessary, and are extremely important, in developing an understanding of the ...
In this article we present a new numerical procedure for solving exactly the Riemann problem of comp...
Neste trabalho obtivemos uma solução do problema de Riemann associado a um sistema de duas leis de ...
Abstract: . For the system of equations of two-component, two-phase filtration, which in f...
We propose a 2 × 2 hyperbolic system of conservation laws to model the dynamics of two incompressibl...
Immiscible three-phase flow in a rigid porous medium is upscaled from the pore to the continuum (Dar...
Immiscible three-phase flow in a rigid porous medium is upscaled from the pore to the continuum (Dar...
We propose a 2 × 2 hyperbolic system of conservation laws to model the dynamics of two incompressibl...
In the first part of thesis we deal with two-phase multicomponent, partially miscible, compressible ...
The multiphase Darcy model used to represent two-phase immiscible displacement flow within porous me...
International audienceThe paper is devoted to the computation of two-phase flows in a porous medium ...
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