Acta Photonica Sinica, Volume. 48, Issue 4, 415001(2019)
2+1 Phase-shifting Algorithm Based on Background Correction
[1] [1] ZHANG S. High-speed 3D shape measurement with structured light methods: a review[J].Optics and Lasers in Engineering, 2018, 106: 119-131.
[2] [2] ZUO C, FENG S J, HUANG L, et al. Phase shifting algorithms for fringe projection profilometry: a review[J]. Optics and Lasers in Engineering, 2018, 109: 23-59.
[3] [3] TAKEDA M, MOTOH K. Fourier transform profilometry for the automatic measurement of 3-D object shapes[J]. Applied Optics, 1983, 22(24): 3977-3982.
[4] [4] LI B W, LIU Z P, ZHANG S. Motion-induced error reduction by combining Fourier transform profilometry with phase-shifting profilometry[J].Optics Express, 2016, 24(20): 23289-23303.
[5] [5] SRINIVASAN V, LIU H C, HALIOUA M. Automated phase-measuring profilometry of 3D diffuse objects[J]. Applied Optics, 1984, 23(18): 3105-3108.
[6] [6] ZHU L, CAO Y P, HE D W, et al. Grayscale imbalance correction in real-time phase measuring profilometry[J]. Optics Communications, 2016, 376: 72-80.
[7] [7] ZHAI Ai-ping, CAO Yi-ping, HE Yu-hang, et al. 3D measurement with orthogonal composite structure light based on two-plus-one phase-shifting algorithm[J]. Chinese Journal of Lasers, 2012, 39(2): 0208003.
[8] [8] HU Y, CHEN Q, ZHANG Y Z, et al. Dynamic microscopic 3D shape measurement based on marker-embedded Fourier transform profilometry[J]. Applied Optics, 2018, 57(4): 772-780.
[9] [9] ZHANG G M, TANG H W, ZHONG K, et al. High-speed FPGA-based phase measuring profilometry architecture[J] Optics Express, 2017, 25(9): 10553-10564.
[10] [10] MA M X, CAO Y P, HE D W, et al. Grayscale imbalance correcting method based on fringe normalization in RGB tricolor real-time three-dimensional measurement[J]. Optical Engineering, 2016, 55(3): 034102.
[11] [11] ZHANG Xiao-xuan, WANG Yue-min, HUANG Shu-jun, et al. A two-step phase-shifting algorithm for phase calculation[J]. Acta Photonica Sinica, 2017, 46(3): 0311005.
[12] [12] TAO T Y, CHEN Q, DA J, et al. Real-time 3-D shape measurement with composite phase-shifting fringes and multi-view system[J]. Optics Express, 2016, 24(18): 20253-20269.
[14] [14] WANG Y, JIANG C, ZHANG S. Double-pattern triangular pulse width modulation technique for high-accuracy high-speed 3D shape measurement[J]. Optics Express, 2017, 25(24): 30177-30188.
[15] [15] WIZINOWICH P L. Phase shifting interferometry in the presence of vibration: a new algorithm and system[J]. Applied Optics, 1990, 29(22): 3271-3297.
[16] [16] ZHANG S, YAU S T. High-speed three-dimensional shape measurement using a modified two-plus-one phase-shifting algorithm[J].Optical Engineering, 2007, 46(11): 113603.
[17] [17] HOANG T, PAN B, NGUYEN D, et al. Generic gamma correction for accuracy enhancement in fringe-projection profilometry[J]. Optics Letters, 2010, 35(12): 1992-1994.
[18] [18] WANG X, FANG S P, ZHU X D. Weighted least-squares phase unwrapping algorithm based on a non-interfering image of an object[J].Applied Optics, 2017, 56(15): 4543-4550.
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LI Dong-lin, CAO Yi-ping. 2+1 Phase-shifting Algorithm Based on Background Correction[J]. Acta Photonica Sinica, 2019, 48(4): 415001
Received: Jan. 8, 2019
Accepted: --
Published Online: Apr. 28, 2019
The Author Email: Dong-lin LI (1464225240@qq.com)