Monotonicity in  RT  0  and PWCF methods on triangular and tetrahedral meshes

E. Kikinzon; Y. Kuznetsov; Z. Liu

doi:10.1134/S1995080216050061

Monotonicity in RT₀ and PWCF methods on triangular and tetrahedral meshes

作者: Kikinzon E.¹, Kuznetsov Y.², Liu Z.²
隶属关系:
1. Computational Earth Science, EES-16
2. Department of Mathematics
期: 卷 37, 编号 5 (2016)
页面: 550-560
栏目: Article
URL: https://journals.rcsi.science/1995-0802/article/view/198264
DOI: https://doi.org/10.1134/S1995080216050061
ID: 198264

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详细

In this paper we derive the monotonicity conditions for condensed-algebraic systems obtained by the discretization of the Poisson’s problem by the classical lowest order Raviart–Thomas (RT₀) and the piece-wise constant fluxes (PWCF) MFE methods on triangular and tetrahedral meshes. We also establish the correspondence between the condensed system matrices resulting from application of these two methods.

关键词

Vector function, triangular mesh, tetrahedral mesh

作者简介

E. Kikinzon

Computational Earth Science, EES-16

编辑信件的主要联系方式.
Email: kikinzon@lanl.gov
美国, Los Alamos, NM, 87545

Y. Kuznetsov

Department of Mathematics

Email: kikinzon@lanl.gov
美国, 641 PGH, Houston, TX, 77204

Z. Liu