Abstract
A linear system model for planar concave grating demultiplexer is developed based on the scalar diffraction theory. With this model the system can be simulated by using Fourier transform. Many device performances such as dispersion features, N × N interconnection, channel uniformity, insertion loss, crosstalk can be estimated or optimized. Furthermore, the behavior of aberration is included in the generalized model.
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References
Born, M. and E. Wolf. Principles of Optics, Pergamon Press, Oxford, 1975.
Dragone, C. J. Lightwave Tech. 7 479, 1989.
Goodman, J.W. Introduction to Fourier Optics, McGraw Hill, San Francisco, 1968.
Koteles, E.S. Fiber and Integrated Optics 18 211, 1999.
Marz, R. and C. Cremer. J. Lightwave Tech. 10 2017, 1992.
McGreer, K.A. IEEE Photon. Tech. Lett. 7 324, 1995.
Namioka, T. J. Opt. Soc. Am. 49 446, 1959.
Nolting, H.P. and R. Marz. J. Lightwave Tech. 13 216, 1995.
Smit, M.K. and C.V. Dam. IEEE J. Selected Topics Quant. Electron. 2 236,1996.
Takahashi, H., K. Okamoto and Y. Inoue. NTT Review 10 37, 1998.
Veldcamp, W.B. Appl. Opt. 21 469, 1981.
Velzel, C.H.F. J. Opt. Soc. Am. 66 346, 1976.
Yang, G., B. Dong and B. Gu et al. Appl. Opt. 33 209, 1994.
Yevick, D. Opt. Quant. Electron. 26 S185, 1994.
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Wang, D., Yan, Y. & Jin, G. Linear system model for planar concave grating demultiplexer. Optical and Quantum Electronics 33, 1223–1232 (2001). https://doi.org/10.1023/A:1013358124521
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DOI: https://doi.org/10.1023/A:1013358124521