Incremental unknowns for solving partial differential equations.
Numerische Mathematik (1991)
- Volume: 59, Issue: 3, page 255-272
- ISSN: 0029-599X; 0945-3245/e
Access Full Article
top
How to cite
topChen, Min, and Temam, Roger. "Incremental unknowns for solving partial differential equations.." Numerische Mathematik 59.3 (1991): 255-272. <http://eudml.org/doc/133548>.
@article{Chen1991,
author = {Chen, Min, Temam, Roger},
journal = {Numerische Mathematik},
keywords = {incremental unknowns; multi-level discretization; conjugate gradient; elliptic equations; finite differences; fractal attractors; Laplace operator; numerical tests; V-cycle multigrid method},
number = {3},
pages = {255-272},
title = {Incremental unknowns for solving partial differential equations.},
url = {http://eudml.org/doc/133548},
volume = {59},
year = {1991},
}
TY - JOUR
AU - Chen, Min
AU - Temam, Roger
TI - Incremental unknowns for solving partial differential equations.
JO - Numerische Mathematik
PY - 1991
VL - 59
IS - 3
SP - 255
EP - 272
KW - incremental unknowns; multi-level discretization; conjugate gradient; elliptic equations; finite differences; fractal attractors; Laplace operator; numerical tests; V-cycle multigrid method
UR - http://eudml.org/doc/133548
ER -
Citations in EuDML Documents
top- Jean-Paul Chehab, A nonlinear adaptative multiresolution method in finite differences with incremental unknowns
- Rolf Bronstering, Min Chen, Bifurcations of finite difference schemes and their approximate inertial forms
- Jean-Paul Chehab, Incremental unknowns method and compact schemes
- J.-P. Chehab, A. Miranville, Incremental unknowns on nonuniform meshes
NotesEmbed ?
topYou must be logged in to post comments.
To embed these notes on your page include the following JavaScript code on your page where you want the notes to appear.