10.17632/62twjjh3f9.1
D.V. Anderson
D.V.
Anderson
ICCG3: Subprograms for the solution of a linear symmetric matrix equation arising from A 7, 15, 19 or 27 point 3d discretization
Mirror of Mendeley Data
2019
Computational Physics
Computational Method
2019-12-06 07:39:07
Dataset
https://mendeley.figshare.com/articles/dataset/ICCG3_Subprograms_for_the_solution_of_a_linear_symmetric_matrix_equation_arising_from_A_7_15_19_or_27_point_3d_discretization/11333855
Title of program: ICCG3
Catalogue Id: ACEX_v1_0
Nature of problem
Elliptic and parabolic partial differential equations which arise in plasma physics applications (as well as in others) are solved in three dimensions. Plasma diffusion, equilibria, and phase space transport (Fokker-Planck equation) have been treated by similar methods in two dimensions using the codes ICCG2 and ILUCG2. These problems share the common feature of being stiff and requiring implicit solution techniques. Sometimes, the resulting matrix equations are symmetric; we solve them here wit ...
Versions of this program held in the CPC repository in Mendeley Data
ACEX_v1_0; ICCG3; 10.1016/0010-4655(83)90122-4
This program has been imported from the CPC Program Library held at Queen's University Belfast (1969-2019)