K. Fu, Z. Wang, J. Zhang, Q. Zhang, “Fast processing of Fourier modal method for perpendicularly crossed surface-relief binary-period gratings,” Acta Opt. Sin. 21, 236–241 (2001) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Zhang, Q. Zhang, “A modal theory and recursion RTCM algorithm for gratings of deep grooves and arbitrary profile,” Sci. China, Ser. A 42, 636–645 (1999).

[CrossRef]

K. Fu, Z. Wang, D. Zhang, J. Wen, J. Tang, “A vector analytical method of phase diffraction grating,” Acta Opt. Sin. 17, 1652–1659 (1997) (in Chinese).

L. Li, “New formulation of the Fourier modal method for crossed surface-relief gratings,” J. Opt. Soc. Am. A 14, 2758–2767 (1997).

[CrossRef]

L. Li, “A modal analysis of lamellar diffraction gratings in conical mountings,” J. Mod. Opt. 40, 553–573 (1993).

[CrossRef]

X. Tang, K. Fu, Z. Wang, X. Liu, “Analysis of rigorous modal theory for arbitrary dielectric gratings made withanisotropic materials,” Acta Opt. Sin. 22, 774–779 (2002) (in Chinese).

K. Fu, Z. Wang, J. Zhang, Q. Zhang, “Fast processing of Fourier modal method for perpendicularly crossed surface-relief binary-period gratings,” Acta Opt. Sin. 21, 236–241 (2001) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Zhang, Q. Zhang, “A modal theory and recursion RTCM algorithm for gratings of deep grooves and arbitrary profile,” Sci. China, Ser. A 42, 636–645 (1999).

[CrossRef]

K. Fu, Z. Wang, D. Zhang, J. Wen, J. Tang, “A vector analytical method of phase diffraction grating,” Acta Opt. Sin. 17, 1652–1659 (1997) (in Chinese).

In this paper the flop counts of matrix operations are based on information provided in G. H. Golub, C. F. Van Loan, Matrix Computations (John Hopkins University Press, Baltimore, Md., 1983, 1989, and 1996). To be consistent with Table 1 of Ref. 1, the meaning of a flop follows the original definition given by the authors in the first edition of their book. See the footnote on page 18 of the third edition.

L. Li, “New formulation of the Fourier modal method for crossed surface-relief gratings,” J. Opt. Soc. Am. A 14, 2758–2767 (1997).

[CrossRef]

L. Li, “Use of Fourier series in the analysis of discontinuous periodic structures,” J. Opt. Soc. Am. A 13, 1870–1876 (1996).

[CrossRef]

L. Li, “Formulation and comparison of two recursive matrix algorithms for modeling layered diffraction gratings,” J. Opt. Soc. Am. A 13, 1024–1035 (1996).

[CrossRef]

L. Li, “Multilayer-coated diffraction gratings: differential method of Chandezon et al. revisited ,” J. Opt. Soc. Am. A JOAOD6 11, 2816–2828 (1994); errata: J. Opt. Soc. Am. A JOAOD6 13, 543 (1996).

[CrossRef]

L. Li, “A modal analysis of lamellar diffraction gratings in conical mountings,” J. Mod. Opt. 40, 553–573 (1993).

[CrossRef]

X. Tang, K. Fu, Z. Wang, X. Liu, “Analysis of rigorous modal theory for arbitrary dielectric gratings made withanisotropic materials,” Acta Opt. Sin. 22, 774–779 (2002) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Wen, J. Tang, “A vector analytical method of phase diffraction grating,” Acta Opt. Sin. 17, 1652–1659 (1997) (in Chinese).

X. Tang, K. Fu, Z. Wang, X. Liu, “Analysis of rigorous modal theory for arbitrary dielectric gratings made withanisotropic materials,” Acta Opt. Sin. 22, 774–779 (2002) (in Chinese).

In this paper the flop counts of matrix operations are based on information provided in G. H. Golub, C. F. Van Loan, Matrix Computations (John Hopkins University Press, Baltimore, Md., 1983, 1989, and 1996). To be consistent with Table 1 of Ref. 1, the meaning of a flop follows the original definition given by the authors in the first edition of their book. See the footnote on page 18 of the third edition.

X. Tang, K. Fu, Z. Wang, X. Liu, “Analysis of rigorous modal theory for arbitrary dielectric gratings made withanisotropic materials,” Acta Opt. Sin. 22, 774–779 (2002) (in Chinese).

K. Fu, Z. Wang, J. Zhang, Q. Zhang, “Fast processing of Fourier modal method for perpendicularly crossed surface-relief binary-period gratings,” Acta Opt. Sin. 21, 236–241 (2001) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Zhang, Q. Zhang, “A modal theory and recursion RTCM algorithm for gratings of deep grooves and arbitrary profile,” Sci. China, Ser. A 42, 636–645 (1999).

[CrossRef]

K. Fu, Z. Wang, D. Zhang, J. Wen, J. Tang, “A vector analytical method of phase diffraction grating,” Acta Opt. Sin. 17, 1652–1659 (1997) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Wen, J. Tang, “A vector analytical method of phase diffraction grating,” Acta Opt. Sin. 17, 1652–1659 (1997) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Zhang, Q. Zhang, “A modal theory and recursion RTCM algorithm for gratings of deep grooves and arbitrary profile,” Sci. China, Ser. A 42, 636–645 (1999).

[CrossRef]

K. Fu, Z. Wang, D. Zhang, J. Wen, J. Tang, “A vector analytical method of phase diffraction grating,” Acta Opt. Sin. 17, 1652–1659 (1997) (in Chinese).

K. Fu, Z. Wang, J. Zhang, Q. Zhang, “Fast processing of Fourier modal method for perpendicularly crossed surface-relief binary-period gratings,” Acta Opt. Sin. 21, 236–241 (2001) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Zhang, Q. Zhang, “A modal theory and recursion RTCM algorithm for gratings of deep grooves and arbitrary profile,” Sci. China, Ser. A 42, 636–645 (1999).

[CrossRef]

K. Fu, Z. Wang, J. Zhang, Q. Zhang, “Fast processing of Fourier modal method for perpendicularly crossed surface-relief binary-period gratings,” Acta Opt. Sin. 21, 236–241 (2001) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Zhang, Q. Zhang, “A modal theory and recursion RTCM algorithm for gratings of deep grooves and arbitrary profile,” Sci. China, Ser. A 42, 636–645 (1999).

[CrossRef]

K. Fu, Z. Wang, J. Zhang, Q. Zhang, “Fast processing of Fourier modal method for perpendicularly crossed surface-relief binary-period gratings,” Acta Opt. Sin. 21, 236–241 (2001) (in Chinese).

X. Tang, K. Fu, Z. Wang, X. Liu, “Analysis of rigorous modal theory for arbitrary dielectric gratings made withanisotropic materials,” Acta Opt. Sin. 22, 774–779 (2002) (in Chinese).

K. Fu, Z. Wang, D. Zhang, J. Wen, J. Tang, “A vector analytical method of phase diffraction grating,” Acta Opt. Sin. 17, 1652–1659 (1997) (in Chinese).

L. Li, “A modal analysis of lamellar diffraction gratings in conical mountings,” J. Mod. Opt. 40, 553–573 (1993).

[CrossRef]

L. Li, “Use of Fourier series in the analysis of discontinuous periodic structures,” J. Opt. Soc. Am. A 13, 1870–1876 (1996).

[CrossRef]

E. L. Tan, “Note on formulation of the enhanced scattering- (transmittance-) matrix approach,” J. Opt. Soc. Am. A 19, 1157–1161 (2002).

[CrossRef]

M. G. Moharam, D. A. Pommet, E. B. Grann, T. K. Gaylord, “Stable implementation of the rigorous coupled-wave analysis for surface-relief gratings: enhanced transmittance matrix approach,” J. Opt. Soc. Am. A 12, 1077–1086 (1995).

[CrossRef]

L. Li, “Multilayer-coated diffraction gratings: differential method of Chandezon et al. revisited ,” J. Opt. Soc. Am. A JOAOD6 11, 2816–2828 (1994); errata: J. Opt. Soc. Am. A JOAOD6 13, 543 (1996).

[CrossRef]

L. Li, “New formulation of the Fourier modal method for crossed surface-relief gratings,” J. Opt. Soc. Am. A 14, 2758–2767 (1997).

[CrossRef]

L. Li, “Formulation and comparison of two recursive matrix algorithms for modeling layered diffraction gratings,” J. Opt. Soc. Am. A 13, 1024–1035 (1996).

[CrossRef]

K. Fu, Z. Wang, D. Zhang, J. Zhang, Q. Zhang, “A modal theory and recursion RTCM algorithm for gratings of deep grooves and arbitrary profile,” Sci. China, Ser. A 42, 636–645 (1999).

[CrossRef]

In this paper the flop counts of matrix operations are based on information provided in G. H. Golub, C. F. Van Loan, Matrix Computations (John Hopkins University Press, Baltimore, Md., 1983, 1989, and 1996). To be consistent with Table 1 of Ref. 1, the meaning of a flop follows the original definition given by the authors in the first edition of their book. See the footnote on page 18 of the third edition.