Finite element methods for nonlinear flows in porous media
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Publication:795670
DOI10.1016/0045-7825(85)90041-6zbMath0542.76117OpenAlexW1975212275MaRDI QIDQ795670
Publication date: 1985
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0045-7825(85)90041-6
mixed finite element methodsmodified method of characteristicsnonlinearmodel problemsingularity removalfluid velocitieslarge-scale reservoir simulationself-adaptive local grid refinementSpecial finite element techniques
Related Items (3)
Mathematical modeling of the multicomponent flow in porous media using higher-order methods ⋮ Numerical simulation of liquid redistribution in permeable media involving hysteresis. ⋮ Efficient adaptive procedures for fluid-flow applications
Cites Work
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- Self-adaptive finite element and finite difference methods for one-dimensional two-phase immiscible flow
- Adaptive mesh refinement for hyperbolic partial differential equations
- Mixed finite element approximation of phase velocities in compositional reservoir simulation
- Self-adaptive finite element simulation of miscible displacement in porous media
- Discontinuous upwinding and mixed finite elements for two-phase flows in reservoir simulation
- Convergence analysis of an approximation of miscible displacement in porous media by mixed finite elements and a modified method of characteristics
- Generalised Galerkin methods for hyperbolic problems
- Elliptic grid generation
- A time-discretization procedure for a mixed finite element approximation of miscible displacement in porous media
- Numerical Methods for a Model for Compressible Miscible Displacement in Porous Media
- The approximation of the pressure by a mixed method in the simulation of miscible displacement
- Moving Finite Elements. II
- On a Data Structure for Adaptive Finite Element Mesh Refinements
- Galerkin Methods for Miscible Displacement Problems in Porous Media
- An Adaptive Finite Element Method for Initial-Boundary Value Problems for Partial Differential Equations
- Numerical Methods for Convection-Dominated Diffusion Problems Based on Combining the Method of Characteristics with Finite Element or Finite Difference Procedures
- Efficient Time-Stepping Methods for Miscible Displacement Problems in Porous Media
- A‐posteriori error estimates for the finite element method
- Error Estimates for Adaptive Finite Element Computations
- Nested Dissection of a Regular Finite Element Mesh
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