Abstract
This paper is devoted to the numerical reliability and time requirements of the Mixed Finite Element (MFE) and Mixed-Hybrid Finite Element (MHFE) methods. The behavior of these methods is investigated under the influence of two factors: the mesh discretization and the medium heterogeneity. We show that, unlike the MFE, the MHFE suffers with the presence of badly shaped discretized elements. Thereat, a numerical reliability analyzing software (Aquarels) is used to detect the instability of a matrix-inversion code generated automatically by a symbolic manipulator. We also show that the spectral condition number of the algebraic systems furnished by both methods in heterogeneous media grows up linearly according to the smoothness of the hydraulic conductivity. Furthermore, it is found that the MHFE could accumulate numerical errors if large jumps in the tensor of conductivity take place. Finally, we compare running-times for both algorithms by giving various numerical experiments.
Original language | English (US) |
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Pages (from-to) | 161-194 |
Number of pages | 34 |
Journal | Computational Geosciences |
Volume | 6 |
Issue number | 2 |
DOIs | |
State | Published - 2002 |
Externally published | Yes |
Keywords
- Elliptic/parabolic problems
- Flow in porous media
- Functional stability
- Mixed and mixed-hybrid methods
- Symbolic programming
ASJC Scopus subject areas
- Computers in Earth Sciences
- Computational Mathematics
- Computer Science Applications
- Computational Theory and Mathematics