两个不同光栅的Lau效应

郑智; 姚金; 朱岱巍; 林伟华

doi:doi:10.3788/lop51.090501

激光与光电子学进展, 2014, 51 (9): 090501, 网络出版: 2014-08-15

两个不同光栅的Lau效应下载： 878次

Lau Effect of Two Different Gratings

论文大纲

郑智 ^*姚金朱岱巍林伟华

作者单位

武汉大学物理科学与技术学院, 湖北武汉430072

相干光学双光栅 Lau 效应傅里叶变换 coherence optics double gratings Lau effect Fourier transformation

摘要

对两个不同光栅形成的Lau条纹分布进行了理论分析与实验研究。一般用于推导Lau条纹强度分布函数的方法比较复杂，其中基于交叉谱密度函数推导Lau条纹强度分布函数的方法相对简单。对该方法推导两个全同光栅Lau条纹强度分布函数的过程进行了仔细研究，并寻求将该方法进一步推广应用于两个不同光栅。探讨了该方法在光栅常数相同但占空比不同的两光栅情况下的适用性，并获得了光栅位置前后互换两种情况下简化的Lau 条纹强度分布函数，理论计算得到了实验结果的验证。因此，基于交叉谱密度函数的部分相干光理论可用于推导光栅常数相同、占空比不同的两个光栅的Lau 条纹分布函数。

Abstract

The field distributions of Lau fringes for two different gratings are theoretically and experimentally investigated. The majority of the methods that are used to deduce the intensity distribution function of the Lau effect are rather complicated, among these, the method based on the cross-spectral density function is relatively easy. The process of deducing the intensity distribution function of Lau fringes generated by double identical gratings is studied based on the method, and the method is tried to be applied in a more general situation, two different gratings. The feasibility of the method in the situation of two gratings with the same grating constant but different duty ratios is discussed, and the simplified intensity distribution functions of two cases, in which the arranged positions of the two gratings are swapped, are achieved. The theoretical predictions are well demonstrated by the experimental results. Thus, the partially coherent theory based on the cross- spectral density function also works in the situation with two gratings of the same grating constant and different duty ratios.

参考文献

[1] H F Talot. Facts relating to optical science [J]. Phil Mag, 1836, 9(56): 401-407.

[2] E Lau. Beugungserscheinungen and dopperlrastern [J]. Ann Phys, 1948, 6: 417-423.

[3] 顾去吾. 莫尔现象、干涉术和全息术[J]. 光学学报, 1981, 1(2): 135-142.

Gu Quwu. Moire phenominon, interferometry and holography [J]. Acta Optica Sinica, 1981, 1(2): 135-142.

[4] 张海联, 顾去吾. 双光栅白光衍射干涉的消色效应[J]. 光学学报, 1993, 13(9): 818-823.

Zhang Hailian, Gu Quwu. Achromatic effect of white light double grating diffraction interference [J]. Acta Optica Sinica, 1993, 13(9): 818-823.

[5] 谭峭峰, 严瑛白, 金国藩, 等. 双光栅准直测量系统及其精度分析[J]. 实用测试技术, 1997, (3): 10-13.

Tan Qiaofeng, Yan Yingbai, Jin Guofan, et al.. The double gratings beam collimation measure system and its precision analysis [J]. Practical Measurment Technology, 1997, (3): 10-13.

[6] 赵宏, 陈文艺, 谭玉山. 利用莫尔条纹的准正弦特性的三维轮廓术[J]. 光学学报, 1994, 14(8): 834-837.

Zhao Hong, Chen Wenyi, Tan Yushan. Three- dimensional contouring by using quai- sine characteristic of Moire pattern [J]. Acta Optica Sinica, 1994, 14(8): 834-837.

[7] 陈水波. 利用双光栅的多普勒频移测速度[J]. 物理实验, 2007, 27(7): 6-9.

Chen Shuibo. Velocity measurement by Doppler shift of double gratings [J]. Physics Experimentation, 2007, 27(7): 6-9.

[8] M Thakur, C Quan, C J Tay. Surface profiling using fringe projection technique based on Lau effect [J]. Opt & Laser Tech, 2007, 39(3): 453-459.

[9] 张鹏, 周惠君, 王思慧. 激光双光栅法测微小位移中光拍信号的振幅调制[J]. 实验室研究与探索, 2009, 28(2): 15-19.

Zhang Peng, Zhou Huijun, Wang Sihui. Amplitude modulation of resultant light signal in measuring of tiny displacement with double gratings [J]. Research and Exploration in Laboratory, 2009, 28(2): 15-19.

[10] 白龙, 杨华勇, 罗洪. 光纤布拉格光栅地听器设计研究[J]. 激光与光电子学进展, 2012, 49(11): 110601.

Bai Long, Yang Huayong, Luo Hong. Study on fiber Bragg grating- based geophone [J]. Laser & Optoelectronics Progress, 2012, 49(11): 110601.

[11] 孔鹏, 唐玉国, 巴音贺希格, 等. 双光栅切换微型平场全息凹面光栅光谱仪[J]. 光学学报, 2013, 33(1): 0105001.

Kong Peng, Tang Yuguo, Bayanheshig, et al.. Double- grating minitype flat- field holographic concave grating spectrograph [J]. Acta Optica Sinica, 2013, 33(1): 0105001.

[12] 马游春, 刘红雨, 杨远洪, 等. 基于随机非均匀采样的重叠双光栅动态应变传感实验研究[J]. 中国激光, 2013, 40(7): 0705002.

Ma Youchun, Liu Hongyu, Yang Yuanhong, et al.. Experimental research on dynamic strain sensing of superimposed fiber Bragg gratings based on random non-uniform sampling [J]. Chinese J Lasers, 2013, 40(7): 0705002.

[13] 魏敬波, 胡贵军, 杜洋, 等. 全光增益控制高功率光纤放大器[J]. 光学学报, 2013, 33(7): 0706012.

Wei Jingbo, Hu Guijun, Du Yang, et al.. High power all- optical gain- clamped fiber amplifier [J]. Acta Optica Sinica,2013, 33(7): 0706012.

[14] J Jahns, A W Lohmann. The Lau effect (a diffraction experiment with incoherent illumination) [J]. Opt Commun, 1979,28(3): 263-267.

[15] F Gori. Lau effect and coherence theory [J]. Opt Commun, 1979, 31(1): 4-8.

[16] R Sudol, B J Thompson. Lau effect: Theory and experiment [J]. App Opt, 1981, 20(6): 1107-1116.

[17] K Patorski. Incoherent superposition of multiple self- imaging Lau effect and Moire fringe explanation [J]. Opt Acta,1983, 30(6): 745-758.

[18] S C Som, A Satpathi. The generalized Lau effect [J]. J Mod Opt, 1990, 37(7): 1215-1226.

[19] G J Swanson, E N Leith. Analysis of the Lau effect and generalized grating imaging [J]. J Opt Soc Am A, 1985, 2(6): 789-793.

[20] J C Bhattacharya. Refractive index measurement [J]. Opt & Laser Tech, 1987, 19(1): 29-32.

[21] S Prakash, S Singh, A Vermaa. Low cost technique for automated measurement of focal length using Lau effect combined with Moire readout [J]. J Mod Opt, 2006, 53(14): 2033-2042.

[22] D Crespo, J Alonso, T Morlanes, et al.. Optical encoder based on the Lau effect [J]. Opt Eng, 2000, 39(3): 817-824.

郑智, 姚金, 朱岱巍, 林伟华. 两个不同光栅的Lau效应[J]. 激光与光电子学进展, 2014, 51(9): 090501. Zheng Zhi, Yao Jin, Zhu Daiwei, Lin Weihua. Lau Effect of Two Different Gratings[J]. Laser & Optoelectronics Progress, 2014, 51(9): 090501.

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