Analysis of Channel Multilayer Waveguides with the Two Dimensional Finite Difference Time Domain Method

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[2] S. Ohke, T. Umeda, Y. Cho. Optical waveguides using GaAs-AlxGa1-xAs muliple quantum well. Opt. Commun., 1985, 56(4): 235～239

[3] T. Miyoshi, H. Goto, H. Kimura. Transmission characteristics of optical waveguides with multi-quantum-well structures. Electron. Lett., 1986, 22(18): 953～954

[4] Y. F. Li, J. W. Y. Lit. General formulas for the guiding properties of a multilayer slab waveguide. J. Opt. Soc. Am. (A), 1987, 4(4): 671～677

[5] S. Ohke, T. Umeda, Y. Cho. TM-mode propagation and form birefringence in a GaAs-AlGaAs multiple quantum well optical waveguide. Opt. Commun., 1989, 70(2): 92～96

[6] J. Kraus, P. P. Deimel. Calculation of the propagation constant of optical modes in multi-quantum-well structures. IEEE J. Quant. Electron., 1990, QE-26(5): 824～826

[7] A. P. Zhao, S. R. Cvetkovic. Finite element analysis of semiconductor laser arrays. Microwave and Optical Technol. Lett., 1991, 4(7): 247～250

[8] R. Smith, L. Molter, M. Dutta. Evaluation of refractive index approximations used for mode determination in multiple quantum well slab waveguides. IEEE J. Quant. Electron., 1991, QE-27(5): 1119～1122

[9] A. P. Zhao, S. R. Cvetkovic. Numerical modeling of nonlinear TE waves in multiple quantum-well waveguides. IEEE Photon. Technol. Lett., 1992, 4(6): 623～626

[10] G. M. Alman, L. A. Molter, H. Shen et al.. Refractive index approximations form linear perturbation theory for planar MQW waveguides. IEEE J. Quant. Electron., 1992, QE-28(3): 650～657

[11] S. R. Cvetkovic, A. P. Zhao. Finite element formalism for linear and nonlinear guided waves in multiple-quantum-well waveguides. J. Opt. Soc. Am. B, 1993, 10(8): 1401～1407

[12] C. Ma. Coupling properties in periodic waveguides and in multiple quantum-well waveguides. IEEE J. Quant. Electron., 1994, QE-30(12): 2811～2816

[13] M. Saini, E. Sharma. Analysis of nonlinear MQW waveguides: A simple numerical approach. IEEE Photon. Technol. Lett., 1996, 8(3): 384～386

[15] A. P. Zhao, S. R. Cvetkovic, M. Punjani. Analysis of stripe multilayer waveguides with effective index and finite element methods. IEEE J. Quant. Electron., 1992, QE-28(3): 573～579

[16] N. Osman, M. Koshiba, R. Kaji. A comprehensive analysis of multilayer channel waveguides. J. Light Wave Technol., 1994, 12(5): 821～826

[17] A. Asi, L. Shafai. Dispersion analysis of anisotropic inhomogeneous waveguides using compact 2D-FDTD. Electron. Lett., 1992, 28(15): 1451～1452

[18] A. C. Cangellaris. Numerical stability and numerical dispersion of a compact 2-D/FDTD method used for the dispersion analysis of waveguides. IEEE Microwave and Guided Wave Lett., 1993, 3(1): 3～5

[19] G. Mur. Absorbing boundary conditions for the finite-difference approximation of the time-domain electromagnetic-field equations. IEEE Trans. Electromagn. Compat., 1981, 23(4): 377～382

[20] A. P. Zhao, A. V. Raisanen, S. R. Cvetkovic. A fast and efficient FDTD algorithm for the analysis of planar microstrip discontinuities by using a simple source excitation scheme. IEEE Microwave and Guided Wave Lett., 1995, 5(10): 341～343

[21] M. Koshiba, K. Hayata, M. Suzuki. Approximate scalar finite-element analysis of anisotropic optical waveguides. Electron. Lett., 1982, 18(10): 411～413