Please wait a minute...
浙江大学学报(工学版)
J4  2011, Vol. 45 Issue (3): 440-444    DOI: 10.3785/j.issn.1008-973X.2011.03.007
无线电电子学、计算机技术     
平板光波导中求解泄漏模的新算法
汤树元1,陈芝花2
1.浙江大学 数学系,浙江 杭州 310027;2.浙江工业大学之江学院 理学系,浙江 杭州 310024
New algorithm of computing leaky mode in slab waveguide
TANG Shu-yuan1,CHEN Zhi-hua2
1. Department of Mathematics, Zhejiang University, Hangzhou 310027,China; 2.Department of Science,
Zhijiang College, Zhejiang University of Technology, Hangzhou 310024,China
 全文: PDF  HTML
摘要:

提出新的较完整地求解复的泄漏模的算法:在泄漏模比较小的时候应用Linear Algebra PACKage (Lapack)或者Matlab方法计算其值,在模比较大的时候应用渐近解方法或者渐近解做初值的牛顿迭代法来计算其值.该算法改进了已有的求解泄漏模的方法,如多重瑞利商迭代方法、Lapack或者Matlab方法、渐近解方法和牛顿迭代等算法,并综合了这些方法的优点.数值模拟表明,新的算法可以较完整地得到近似度非常好的泄漏模.
Abstract:

A new method  to obtain the leaky modes in complex plane was developed:when the modes are small, Matlab or linear algebra package (Lapack) method is used to compute the leaky modes; when the modes are large, asymptotic solutions or Newton iteration with the initial values obtained by asymptotic solutions are used to compute the leaky modes. This method develops the existing four kinds of methods(multi-Rayleigh quotient iteration method, Lapack solver, asymptotic solutions, and Newton iteration with the initial values  obtained by asymptotic solutions) and has  their advantages. Numerical examples illustrated that the new method  can be used to get highly approximate leaky modes in complex plane.
出版日期: 2012-03-16
:  O 242  
作者简介: 汤树元(1963-),男,浙江杭州人, 讲师,从事光波导计算的研究.E-mail:win579@sina.com
服务  
把本文推荐给朋友
加入引用管理器
E-mail Alert
RSS
作者相关文章  

引用本文:

汤树元,陈芝花. 平板光波导中求解泄漏模的新算法[J]. J4, 2011, 45(3): 440-444.

TANG Shu-yuan,CHEN Zhi-hua. New algorithm of computing leaky mode in slab waveguide. J4, 2011, 45(3): 440-444.

链接本文:

http://www.zjujournals.com/eng/CN/10.3785/j.issn.1008-973X.2011.03.007        http://www.zjujournals.com/eng/CN/Y2011/V45/I3/440

[1] BERENGER J P.A Perfectly matched layer for the absorption of electromagneticwaves[J].Journal of Computational Physics,1994,114(2):185-200.
[2] CHEW W C,WEEDON W H.A 3D perfectly matched medium from modified Maxwells equations with stretched coordinates[J].Microwave and Optical Technology Letters,1994,7(13):599-604.
[3] STICKLER D C, AMMICHT E. Uniform asymptotic evaluation of the continuous spectrum for the Pekeris model[J].Journal of Acoustical: Society of America,1980,67:2018-2024.
[4] ZHU J X,LU Y Y .Large range step method for acoustic waveguide with two layer media[J].Progress in Natural Science,2002,12:820-825.
[5] DERUDDER H, OLYSLAGER F. Efficient modematching analysis of discontinuities in finite planar substrates using perfectly matched Layers[J].IEEE Transactions on An Tennas and Propagation,2001,49(2):185-195.
[6] HUANG C C. Leaky mode analysis of optical waveguides by legendre and laguerre Pseudospectral Method[J].Microwave and Optical Technology Letters,2008,50(10):2507-2509.
[7] LU Y Y,ZHU J X. Perfectly matched layer for acoustic waveguide modeling benchmark calculations and perturbation analysis[J].Computer Modeling in Engineering and Sciences,2007,22(3):235-248.
[8] KUMAR A, RASTOGI V. Multilayer cladding leaky planar waveguide for highpower applications[J].Applied Physics B,2008,92:577-583.
[9] ZHU J X,ZHOU Q X. Eigenvalue computation in slab waveguides with some perfectly matched layers[J]. Proceedings of SPIE,2004,5279:172-180.
[10] ZHU J X,TANG S S .The algorithm comparison for solving eigen problems in open optical waveguides[J].Proceedings of the SPIE,2005,5638:525-532.
[11] ROGIER H, DE Z D. Berenger and leaky modes in optical fibers terminated with a perfectly matched layer[J].Journal of Lightwave Technoloy,2002,20(7):1141-1148.
[12] ROGIER H, KNOCKAERT L, DE Z D. Fast calculation of the propagation constants of leaky and Berenger modes of planar and circular dielectric waveguides terminated by a perfectly matched layer[J]. Microwave and Optical Technology Letters ,2003,37(3):167-171.
[13] ROGIER H, DE Z D. Berenger and leaky modes in microstrip substrates terminated by a perfectly matched layer[J]. IEEE Transactions on Microwave Theory and Techniques,2001, 49(4):712-715.
[14] ZHU J X,LU Y Y. Leaky modes of slab waveguidesasymptotic solutions[J].IEEE Journal of Lightwave Technology, 2006,24(3):1619-1623.
[15] ZHU J X ,CHEN Z H,TANG S Y. Leaky modes of optical waveguides with varied refractive index for microchip optical interconnect applications – asymptotic solutions[J].Microelectronics Reliability,2008,48:555-562.
No related articles found!