Knowledge Commons of Institute of Automation，CAS
A quasi-wavelet algorithm for second kind boundary integral equations | |
Chen, HL; Peng, SL; Si-Long Peng | |
Source Publication | ADVANCES IN COMPUTATIONAL MATHEMATICS |
1999 | |
Volume | 11Issue:11Pages:355–375 |
Subtype | Article |
Abstract | In solving integral equations with a logarithmic kernel, we combine the Galerkin approximation with periodic quasi-wavelet (PQW) [4]. We develop an algorithm for solving the integral equations with only O(N logN) arithmetic operations, where N is the number of knots. We also prove that the Galerkin approximation has a polynomial rate of convergence. |
Keyword | Periodic Quasi-wavelet Integral Equation Multiscale |
WOS Headings | Science & Technology ; Physical Sciences |
WOS Keyword | HELMHOLTZ-EQUATION ; NUMERICAL-SOLUTION |
Indexed By | SCI |
Language | 英语 |
WOS Research Area | Mathematics |
WOS Subject | Mathematics, Applied |
WOS ID | WOS:000083861000005 |
Citation statistics | |
Document Type | 期刊论文 |
Identifier | http://ir.ia.ac.cn/handle/173211/9784 |
Collection | 09年以前成果 |
Corresponding Author | Si-Long Peng |
Recommended Citation GB/T 7714 | Chen, HL,Peng, SL,Si-Long Peng. A quasi-wavelet algorithm for second kind boundary integral equations[J]. ADVANCES IN COMPUTATIONAL MATHEMATICS,1999,11(11):355–375. |
APA | Chen, HL,Peng, SL,&Si-Long Peng.(1999).A quasi-wavelet algorithm for second kind boundary integral equations.ADVANCES IN COMPUTATIONAL MATHEMATICS,11(11),355–375. |
MLA | Chen, HL,et al."A quasi-wavelet algorithm for second kind boundary integral equations".ADVANCES IN COMPUTATIONAL MATHEMATICS 11.11(1999):355–375. |
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