ANALYSIS OF SPECTRAL APPROXIMATIONS USING PROLATE SPHEROIDAL WAVE FUNCTIONS

被引:0
作者
Wang, Li-Lian [1 ]
机构
[1] Nanyang Technol Univ, Div Math Sci, Sch Phys & Math Sci, Singapore 637371, Singapore
来源
MATHEMATICS OF COMPUTATION | 2010年 / 79卷 / 270期
关键词
Prolate spheroidal wave functions; bandlimited functions; approximations in Sobolev spaces; spectral methods; quasi-uniform grids; DIFFERENTIATION; QUADRATURE; ELEMENT;
D O I
暂无
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper, the approximation properties of the prolate spheroidal wave functions of order zero (PSWFs) are studied, and a set of optimal error estimates are derived for the PSWF approximation of non-periodic functions in Sobolev spaces. These results serve as an indispensable tool for the analysis of PSWF spectral methods. A PSWF spectral-Galerkin method is proposed and analyzed for elliptic-type equations. Illustrative numerical results consistent with the theoretical analysis are also presented.
引用
收藏
页码:807 / 827
页数:21
相关论文
共 34 条
[11]  
Canuto C., 2006, SPECTRAL METHODS
[12]   Spectral methods based on prolate spheroidal wave functions for hyperbolic PDEs [J].
Chen, QY ;
Gottlieb, D ;
Hesthaven, JS .
SIAM JOURNAL ON NUMERICAL ANALYSIS, 2005, 43 (05) :1912-1933
[13]   Recovering signals from inner products involving prolate spheroidals in the presence of jitter [J].
Dabrowska, D .
MATHEMATICS OF COMPUTATION, 2005, 74 (249) :279-290
[14]   A fast algorithm for the calculation of the roots of special functions [J].
Glaser, Andreas ;
Liu, Xiangtao ;
Rokhlin, Vladimir .
SIAM JOURNAL ON SCIENTIFIC COMPUTING, 2007, 29 (04) :1420-1438
[15]   Jacobi approximations in non-uniformly Jacobi-weighted Sobolev spaces [J].
Guo, BY ;
Wang, LL .
JOURNAL OF APPROXIMATION THEORY, 2004, 128 (01) :1-41
[16]  
Hesthaven JS, 2007, C MO AP C M, P1, DOI 10.2277/0521792118
[17]   New efficient methods of computing the prolate spheroidal wave functions and their corresponding eigenvalues [J].
Karoui, Abderrazek ;
Moumni, Tahar .
APPLIED AND COMPUTATIONAL HARMONIC ANALYSIS, 2008, 24 (03) :269-289
[18]   Pseudospectral method based on prolate spheroidal wave functions for frequency-domain electromagnetic simulations [J].
Kovvali, N ;
Lin, WB ;
Carin, L .
IEEE TRANSACTIONS ON ANTENNAS AND PROPAGATION, 2005, 53 (12) :3990-4000
[19]   Rapid prolate pseudospectral differentiation and interpolation with the fast multipole method [J].
Kovvali, Narayan ;
Lin, Wenbin ;
Zhao, Zhiqin ;
Couchman, Luise ;
Carin, Lawrence .
SIAM JOURNAL ON SCIENTIFIC COMPUTING, 2006, 28 (02) :485-497
[20]   PROLATE SPHEROIDAL WAVE FUNCTIONS, FOURIER ANALYSIS AND UNCERTAINTY .3. DIMENSION OF SPACE OF ESSENTIALLY TIME- AND BAND-LIMITED SIGNALS [J].
LANDAU, HJ ;
POLLAK, HO .
BELL SYSTEM TECHNICAL JOURNAL, 1962, 41 (04) :1295-+
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