含梯度折射率缺陷的一维光子晶体滤波性能
徐波波, 郑改革, 吴义根. 含梯度折射率缺陷的一维光子晶体滤波性能[J]. 量子电子学报, 2016, 33(5): 573.
XU Bobo, ZHENG Gaige, WU Yigen. Filtering characteristics of one-dimensional photonic crystal with gradient refractive index defects[J]. Chinese Journal of Quantum Electronics, 2016, 33(5): 573.
[1] Yablonovitch E. Inhibited spontaneous emission in solid-state physics and electronics[J]. Phys. Rev. Lett., 1987, 58(20): 2059-2061.
[2] John S. Strong localization of photons in certain disordered dielectric super lattices[J]. Phys. Rev. Lett., 1987, 58(20): 2486-2489.
[3] Fan Chunzhen, Wang Junqiao, He Jinna, et al. Theoretical study on the photonic band gap in one-dimensional photonic crystals with graded multilayer structure[J]. Chin. Phys. B, 2013, 22(7): 074211.
[4] Wu Kaishun, Chen Dihu, Luo Xiaonan, et al. Phase response of omnidirectional reflection one-dimensional photonic crystals and defect modes[J]. Opt. Comm., 2010, 283(24): 4911-4915.
[5] Tian Yi, Li Qi, Zhang Li, et al. One-dimensional photonic crystal infrared space light modulator imagination[J]. Infrared and Laser Engineering (红外与激光工程), 2012, 41(9): 2333-2338 (in Chinese).
[6] Matloub S, Hosseinzadeh M, Rostami A. The narrow band THz filter in metallic photonic crystal slab framework: Design and investigation[J]. Optik, 2014, 125(125): 6545-6549.
[7] Liu Chichung, Wu Chienjang. Analysis of defect mode in a dielectric photonic crystal containing ITO defect[J]. Optik, 2014, 125(24): 7140-7142.
[9] Zheng Gaige, Xu Bobo, Xu Linhua, et al. Design of photonic crystal Sagnac interferometer using self-collimation effect[J]. Optik, 2015, 12(4): 379-381.
[10] Ghosh R, Ghosh K K, Chakraborty R. Narrow band filter using 1D periodic structure with defects for DWDM systems[J]. Opt. Comm., 2013, 289(4): 75-80.
[11] Deng Liang, Luo Fengguang. Narrow line width and polarization independent multi-channel filter based on one-dimensional photonic crystal containing negative index materials[J]. Optik, 2013, 124(13): 1459-1462.
[12] Yee K S. Numerical solution of initial boundary value problems involving Maxwell equations in isotropic media[J]. IEEE Transactions on Antennas and Propagation, 1966, 14(3): 302-307.
[13] Shlager K L, Sehneider J B. A selective survey of the finite-difference time-domain literature[J]. IEEE Antennas and Propagation Magazine, 1995, 37(4): 39-57.
[14] VileneuveE P R, Fan S, Joannopoulos J D. Microcavities in photonic crystals: Mode symmetry, tenability, and coupling efficiency[J]. Phys. Rev. Lett., 1996, 54(11): 7837-7842.
[15] Gao Benqing. The Finite Difference Time Domain Method (时域有限差分法)[M]. Beijing: National Defense Industry Press, 1995 (in Chinese).
[16] Xi J Q, Schubert M F, Kim J K, et al. Optical thin-film materials with low refractive index for broadband elimination of Fresnel reflection[J]. Nature Photonics, 2007, 1(3): 176-179.
徐波波, 郑改革, 吴义根. 含梯度折射率缺陷的一维光子晶体滤波性能[J]. 量子电子学报, 2016, 33(5): 573. XU Bobo, ZHENG Gaige, WU Yigen. Filtering characteristics of one-dimensional photonic crystal with gradient refractive index defects[J]. Chinese Journal of Quantum Electronics, 2016, 33(5): 573.