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近场散射问题数值计算的超弱变分方法 被引量:2

Ultra Weak Variational Formulation of Numerical Computation for Near-Field Scattering Problem
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摘要 针对以全内反射显微镜为模型的近场散射问题提出一种超弱变分方法.在计算区域网格剖分的基础上,利用Green公式将问题转化到网格边界上求解,并利用平面波函数和倏逝波函数逼近解的局部性态.结果表明,算法能有效数值模拟近场散射问题,适用于大波数情形,收敛速度快. An ultra weak variational method was proposed for the time harmonic scattering problem in view of total internal reflection microscopy as a model.Based on the partition of the computational domain,the problem was transformed into the one on the skeleton of the mesh.By Green identity, the equivalent ultra weak variational formulation was deduced. Then plane wave functions and evanescent wave functions were used to approximate the local property of the solution.The method is suitable for the problems with big wave number,and has a fast rate of convergence,by which the scattering problem in near field can be effectively solved.
作者 栾天 刘明辉
机构地区 北华大学数学与统计学院 吉林大学数学研究所
出处 《吉林大学学报(理学版)》 CAS CSCD 北大核心 2014年第1期39-44,共6页 Journal of Jilin University:Science Edition
基金 国家自然科学基金(批准号:51178001) 吉林省教育厅科研项目(批准号:2013439 2014213)
关键词 超弱变分方法 平面波函数 倏逝波函数 ultra weak variational formulation plane wave function evanescent wave function
分类号 O241.82 [理学—计算数学]
  • 相关文献

参考文献11

  • 1Carney P,Schotland J. Inside Out:Inverse Problems and Applications[M].{H}London:Cambridge University Press,2003.
  • 2Farakawa H,Kawata S. Analysis of Image Formation in a Near-Field Scanning Optical Microscope:Effects of Multiple Scattering[J].{H}Optics communication,1996,(1/2):170-178.
  • 3Tanaka K,Tanaka M,Omoya T. Boundary Integral Equations for a Two-Dimensional Simulator of a Photon Scanning Tunneling Microscope[J].{H}JOURNAL OF THE OPTICAL SOCIETY OF AMERICA A-OPTICS IMAGE SCIENCE AND VISION,1998,(07):1918-1931.
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  • 8栾天,王玉洁,郑恩希.求解近场散射问题的最小二乘方法[J].吉林大学学报(理学版),2013,51(5):811-814. 被引量:8
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二级参考文献11

  • 1Courion D. Near-Field Microscopy and Near-Field Optics [M]. London: Imperial College Press, 2003.
  • 2Carney'P, Schotland J. Inside Out: Inverse Problems and Applications [M]. London: Cambridge University Press, 2003.
  • 3SUN Jin, Carney P, Schotland J C. Strong Tip Effects in Near Field Scanni.ng Optical Tomography [J]. J Appl Phys, 2007, 102(10): 103103.
  • 4Farakawa H, Kawata S. Analysis of Image Formation in a Near Field Scanning Optical Microscope: Effects of Multiple Scattering [J]. Opt Commun, 1996, 132(1/2) : 170-178.
  • 5Tanaka K, Tanaka M, Omoya T. Boundary Integral Equation for a Two Dimensional Simulator of a Photon Scanning Tunneling Microscopy [J]. J Opt Soc Am A, 1998, 15(7): 1918-1931.
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  • 7Stojek M. Least-Squares Trefftz-Type Elements for the Helmholtz Eqaution [J]. Int J Numer Meth Eng, 1998, 41(5): 831 849.
  • 8Monk P, WANG Da-qing. A Least-Squares Method for the Helmholtz Equation [J]. Comput Methods Appl Mech Eg, 1999, 175(1/2): 121-136.
  • 9Barnett A H, Betcke T. An Exponentially Convergent Nonpolynomial Finite Element Method for Time-Harmonic Scattering from Polygons [J]. SIAM J Sci Comput, 2011, 32(3) : 1417-1441.
  • 10ZHENG En-xi, MA Fu-ming. A Least-Squares Non-polynomial Finite Element Method for Solving the Polygonal- Line Grating Problem [J]. Journal of Mathematical Analysis and Applications, 2013, 397(2): 550 -560.

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吉林大学学报(理学版)
2014年 第1期

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