Analysis of fully discrete FEM for miscible displacement in porous media with Bear-Scheidegger diffusion tensor
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Publication:670308
DOI10.1007/s00211-019-01030-0OpenAlexW2889590320MaRDI QIDQ670308
Buyang Li, Wentao Cai, Sun, Weiwei, Yan Ping Lin
Publication date: 18 March 2019
Published in: Numerische Mathematik (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1809.03240
Related Items (6)
Optimal error analysis of Crank–Nicolson lowest‐order Galerkin‐mixed finite element method for incompressible miscible flow in porous media ⋮ New analysis of Galerkin-mixed FEMs for incompressible miscible flow in porous media ⋮ Stability, analyticity, and maximal regularity for parabolic finite element problems on smooth domains ⋮ New analysis and recovery technique of mixed FEMs for compressible miscible displacement in porous media ⋮ New analysis of Galerkin FEMs for miscible displacement in porous media ⋮ Analysis of Lowest-Order Characteristics-Mixed FEMs for Incompressible Miscible Flow in Porous Media
Uses Software
Cites Work
- Maximum-norm stability and maximal \(L^p\) regularity of FEMs for parabolic equations with Lipschitz continuous coefficients
- Discrete maximal parabolic regularity for Galerkin finite element methods
- Strong stability and non-smooth data error estimates for discretizations of linear parabolic problems
- Introduction to modelling of transport phenomena in porous media
- Contractivity and analyticity in \(l^p\) of some approximation of the heat equation
- Pointwise localized error estimates for parabolic finite element equations
- Discrete maximal regularity and the finite element method for parabolic equations
- Discontinuous Galerkin methods for coupled flow and reactive transport problems
- Runge-Kutta time discretization of nonlinear parabolic equations studied via discrete maximal parabolic regularity
- On existence and uniqueness results for a coupled systems modeling miscible displacement in porous media
- Applications of discrete maximal \(L_p\) regularity for finite element operators
- Error analysis of linearized semi-implicit Galerkin finite element methods for nonlinear parabolic equations
- A-Stable Time Discretizations Preserve Maximal Parabolic Regularity
- Maximal $L^p$ analysis of finite element solutions for parabolic equations with nonsmooth coefficients in convex polyhedra
- Maximal Regularity of Fully Discrete Finite Element Solutions of Parabolic Equations
- Combining maximal regularity and energy estimates for time discretizations of quasilinear parabolic equations
- Maximum norm stability and error estimates in parabolic finite element equations
- L∞-boundedness of the finite element galerkin operator for parabolic problems
- Ritz–Volterra Projections to Finite-Element Spaces and Applications to Integrodifferential and Related Equations
- An Optimal-Order Error Estimate for a Family of ELLAM-MFEM Approximations to Porous Medium Flow
- The approximation of the pressure by a mixed method in the simulation of miscible displacement
- Galerkin Methods for Miscible Displacement Problems in Porous Media
- Stability, analyticity, and almost best approximation in maximum norm for parabolic finite element equations
- An Approximation to Miscible Fluid Flows in Porous Media with Point Sources and Sinks by an Eulerian--Lagrangian Localized Adjoint Method and Mixed Finite Element Methods
- Maximum norm analysis of implicit–explicit backward difference formulae for nonlinear parabolic equations
- ON WELL-POSEDNESS OF DIFFERENCE SCHEMES FOR ABSTRACT PARABOLIC EQUATIONS INLP([0,T;E) SPACES]
- Maximum Norm Analysis of Completely Discrete Finite Element Methods for Parabolic Problems
- Oblique Derivative Problems for Elliptic Equations
- Error Estimates of Splitting Galerkin Methods for Heat and Sweat Transport in Textile Materials
- Stability, analyticity, and maximal regularity for parabolic finite element problems on smooth domains
- A New Error Analysis of Characteristics-Mixed FEMs for Miscible Displacement in Porous Media
- Regularity of the Diffusion-Dispersion Tensor and Error Analysis of Galerkin FEMs for a Porous Medium Flow
- The Stability and Convergence of Fully Discrete Galerkin-Galerkin FEMs for Porous Medium Flows
- Best approximation property in the $W^1_{\infty }$ norm for finite element methods on graded meshes
- Finite element methods for surface PDEs
- Discrete Maximal Lp Regularity for Finite Element Operators
- A Priori $L_2 $ Error Estimates for Galerkin Approximations to Parabolic Partial Differential Equations
- Analytic semigroups and optimal regularity in parabolic problems
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