Chinese Journal of Lasers, Volume. 42, Issue s1, 102009(2015)
Numerical Analysis of Intensity Distribution in Nonplanar Ring Resonators
References(17)
[1] [1] T A Dorschner. Nonplanar rings for laser gyroscopes[C]. SPIE,1983,0412:192-202.
[2] [2] H Statz, T A Dorschner, M Holtz, et al.. The Multioscillator ring laser gyroscope[C]. Laser handbook, 1985,4: 230-333.
[3] [3] W W Chow, J Gea-Banacloche, L M Pedrotti, et al.. The ring laser gyro[J]. Rev Mod Phys,1985, 57(1): 61-104.
[4] [4] Feng Tao, Zhang Xuejie, Zhang Yan, et al.. Analysis of optical-axis perturbation in non-planar ring resonator[J]. Chinese J Lasers, 2013, 40(4): 0402006.
[5] [5] T Eberle, S Steinlechner, J Bauchrowitz, et al.. Quantum enhancement of the zero-area sagnac interferometer topology for gravitational wave detection[J]. Phys Rev Lett, 2010, 104(25): 251102.
[6] [6] Y Honda, H Shimizu, M Fukuda, et al.. Stabilization of a nonplanar optical cavity using its polarization property[J]. Opt Commun, 2009, 282(15): 3108-3112.
[7] [7] N V Kravtsov, N N Kravtsov. Nonreciprocal effects in ring lasers[J]. Quantum Electronics, 1999, 29(5): 378-399.
[8] [8] J Yuan, M X Chen, Y Y Li, et al.. Reanalysis of generalized sensitivity factors for optical-axis perturbation in nonplanar ring resonators[J]. Opt Express, 2013, 21(2): 2297-2306.
[9] [9] A C Nilsson, E K Gustafson, R L Byer. Eigenpolarization theory of monolithic nonplanar ring oscillators[J]. IEEE Journal of Quantum Electronics, 1989, 25(4): 767-790.
[10] [10] D D Wen, D Li, J L Zhao. Analysis on the polarization property of the eigenmodes in a nonplanar ring resonator[J]. Applied Optics, 2011, 50(18): 3057-3063.
[11] [11] A B Plachenov, V N Kudashov, A M Radin. Analytical description of a Gaussian beam in a ring resonator with a nonplanar axial contour and an even number of mirrors[J]. Quantum Electron, 2009, 39(3): 261-272.
[12] [12] J Yuan, X W Long, L Liang, et al.. Nonplanar ring resonator modes: generalized Gaussian beams[J]. Applied Optics, 2007, 46(15): 2980-2989.
[13] [13] Lv Baida. Laser Optics(3rd Edition) [M]. Beijing: Higher Education Press, 2003.
[14] [14] Y Y Cheng, Y Q Wang, J Hu, et al.. A novel eigenvector method for calculation of optical resonator modes and beam propgatioin[J]. Acta Phycia Sinica, 2004, 53(8): 2576-2582.
[15] [15] A G Fox, T Li. Resonant modes in a maser interferometer [J]. Bell Sys Tech J, 1961, 40(2): 453-488.
[16] [16] C Jiang, B Li, Y Y Cheng, et al.. Simulation of optical field in laser resonators cavity by eigenvector method[J]. Optics & Laser Technology, 2007, 39(3): 490-499.
[17] [17] J Yuan, M X Chen, Z L Kang, et al.. A novel coordinate system for Gaussian beam reflection[J]. Opt Lett, 2012, 37(11): 2082-2084.
CLP Journals
Tools
Get Citation
Copy Citation Text
Wang Zhiguo, Xiao Guangzong, Ding Zhichao, Lu Guangfeng, Yang Kaiyong. Numerical Analysis of Intensity Distribution in Nonplanar Ring Resonators[J]. Chinese Journal of Lasers, 2015, 42(s1): 102009
Paper Information
Category: Laser physics
Received: Jan. 24, 2015
Accepted: --
Published Online: Sep. 14, 2015
The Author Email: Zhiguo Wang (maxborn@163.com)
© Copyright 2018-2021 | Chinese Laser Press.
All Rights Reserved 沪ICP备15018463号-20