| Residential College | false |
| Status | 已發表Published |
| Stability of T. Chan’s preconditioner from numerical range | |
Cheman Cheng1 ; Xiaoqing Jin1 ; Vaikuong Sin2
| |
| 2007-01 | |
| Source Publication | Numerical Mathematics Theory Methods and Applications
 |
| ISSN | 1004-8979 |
| Volume | 16Issue:1Pages:28-36 |
| Abstract | A matrix is said to be stable if the real parts of all its eigenvalues are negative. In this paper, for any matrix A n , we discuss the stability properties of T. Chan’s preconditioner c U (A n ) from the viewpoint of the numerical range. An application in the numerical solution of ODEs is also given. |
| Keyword | T. Chan’s precondiT.oner Stability Numerical Range Boundary Value Method |
| Indexed By | SCIE |
| Language | 英語English |
| Document Type | Journal article |
| Collection | Faculty of Science and Technology DEPARTMENT OF MATHEMATICS DEPARTMENT OF ELECTROMECHANICAL ENGINEERING |
| Corresponding Author | Xiaoqing Jin |
| Affiliation | 1.Department of Mathematics, University of Macau, Macao 2.Department of Electromechanical Engineering, University of Macau, Macao |
| First Author Affilication | University of Macau |
| Corresponding Author Affilication | University of Macau |
| Recommended Citation GB/T 7714 | Cheman Cheng,Xiaoqing Jin,Vaikuong Sin. Stability of T. Chan’s preconditioner from numerical range[J]. Numerical Mathematics Theory Methods and Applications, 2007, 16(1), 28-36. |
| APA | Cheman Cheng., Xiaoqing Jin., & Vaikuong Sin (2007). Stability of T. Chan’s preconditioner from numerical range. Numerical Mathematics Theory Methods and Applications, 16(1), 28-36. |
| MLA | Cheman Cheng,et al."Stability of T. Chan’s preconditioner from numerical range".Numerical Mathematics Theory Methods and Applications 16.1(2007):28-36. |
| Files in This Item: | There are no files associated with this item. | |||||
Items in the repository are protected by copyright, with all rights reserved, unless otherwise indicated.
Edit Comment