KMS Of Academy of mathematics and systems sciences, CAS
Mathematical analysis for quadrilateral rotated Q(1) element - III: The effect of numerical integration | |
Ming, PB; Shi, ZC | |
2003-05-01 | |
Source Publication | JOURNAL OF COMPUTATIONAL MATHEMATICS |
ISSN | 0254-9409 |
Volume | 21Issue:3Pages:287-294 |
Abstract | This is the third part of the paper for the rotated Q(1) nonconforming element on quadrilateral meshes for general second order elliptic problems. Some optimal numerical formulas are presented and analyzed. The novelty is that it includes a formula with only two sampling points which excludes even a Q(1) unisolvent set. It is the optimal numerical integration formula over a quadrilateral mesh with least sampling points up to now. |
Keyword | quadrilateral rotated Q(1) element numerical quadrature |
Language | 英语 |
WOS Research Area | Mathematics |
WOS Subject | Mathematics, Applied ; Mathematics |
WOS ID | WOS:000183218200003 |
Publisher | VSP BV |
Citation statistics | |
Document Type | 期刊论文 |
Identifier | http://ir.amss.ac.cn/handle/2S8OKBNM/18230 |
Collection | 中国科学院数学与系统科学研究院 |
Affiliation | Chinese Acad Sci, Inst Computat Math, Beijing 100080, Peoples R China |
Recommended Citation GB/T 7714 | Ming, PB,Shi, ZC. Mathematical analysis for quadrilateral rotated Q(1) element - III: The effect of numerical integration[J]. JOURNAL OF COMPUTATIONAL MATHEMATICS,2003,21(3):287-294. |
APA | Ming, PB,&Shi, ZC.(2003).Mathematical analysis for quadrilateral rotated Q(1) element - III: The effect of numerical integration.JOURNAL OF COMPUTATIONAL MATHEMATICS,21(3),287-294. |
MLA | Ming, PB,et al."Mathematical analysis for quadrilateral rotated Q(1) element - III: The effect of numerical integration".JOURNAL OF COMPUTATIONAL MATHEMATICS 21.3(2003):287-294. |
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