Moving finite element method: Applications to general partial differential equations with multiple large gradients
Journal Article
·
· J. Comput. Phys.; (United States)
The moving finite element (MFE) method has been reduced to practice in the automatic solution program DYLA for general systems of transient partial differential equations (PDEs) in 1-D. Several test examples are presented which illustrate the unique node movement and systematic control features which are intrinsic in the MFE method. Computational dilemmas of numerical diffusion, Gibbs overshooting and undershooting, zone tangling, and grid remap (or re-connection) aliasing, which occur frequently in conventional PDE methods, are essentially eliminated in the MFE mehtod. Arbitrarily large gradients (or shocks) can be solved with extremely high resolution and accuracy for non-coincident, or even counterdirected, propagating wavefronts. Boundary layers of arbitrarily small dimensions are solved with high accuracy simultaneously with the large-scale structures in reactive and non-reactive fluid calculations. The MFE method requires a small fraction of the grid nodes which are used in conventional PDE solution methods because the nodes migrate continuously and systematically to those positions where they are most needed in order to yield accurate PDE solutions on entire problem domains. Courant--Friedrichs--Lewy time-step limits are exceeded by wide margins (by factors of two to several thousand). Finally, the extension of the MFE method to 2-D is briefly discussed.
- Research Organization:
- Science Applications, Inc., Pleasanton, California 94566
- OSTI ID:
- 6328686
- Journal Information:
- J. Comput. Phys.; (United States), Journal Name: J. Comput. Phys.; (United States) Vol. 39:3; ISSN JCTPA
- Country of Publication:
- United States
- Language:
- English
Similar Records
Moving finite elements in 2-D. Technical progress report, year 3
One-dimensional moving finite-element model of solute transport
Moving finite elements in 1-D: a review of the method and the coding experience
Technical Report
·
Mon Apr 02 23:00:00 EST 1984
·
OSTI ID:5088894
One-dimensional moving finite-element model of solute transport
Journal Article
·
· Ground Water; (United States)
·
OSTI ID:7274163
Moving finite elements in 1-D: a review of the method and the coding experience
Technical Report
·
Thu Sep 01 00:00:00 EDT 1983
·
OSTI ID:5333588