N M Lyndin scite author profile

The Fourier modal method (FMM), often also referred to as rigorous coupled-wave analysis (RCWA), is known to suffer from numerical instabilities when applied to low-loss metallic gratings under TM incidence. This problem has so far been attributed to the imperfect conditioning of the matrices to be diagonalized. The present analysis based on a modal vision reveals that the so-called instabilities are true features of the solution of the mathematical problem of a binary metal grating dealt with by truncated Fourier representation of Maxwell's equations. The extreme sensitivity of this solution to the optogeometrical parameters is the result of the excitation, propagation, coupling, interference, and resonance of a finite number of very slow propagating spurious modes. An astute management of these modes permits a complete and safe removal of the numerical instabilities at the price of an arbitrarily small and controllable reduction in accuracy as compared with the referenced true-mode method.

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Narrow band resonant grating of 100% reflection under normal incidence

Destouches¹,

Pommier²,

Parriaux³

et al. 2006

Opt. Express

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Long-range surface plasmons in asymmetric layered metal-dielectric structures

Lyndin

Salakhutdinov

Sychugov

et al. 1999

Sensors and Actuators B: Chemical

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Design and fabrication of an all-dielectric grating with top-hat high diffraction efficiency over a broad spectral range

Lyndin¹,

Flury²,

Tonchev³

et al. 2007

J. Eur. Opt. Soc.-Rapid Publ.

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N M Lyndin

Theory and modelling of optical waveguide sensors utilising surface plasmon resonance

Modal analysis and suppression of the Fourier modal method instabilities in highly conductive gratings

Narrow band resonant grating of 100% reflection under normal incidence

Long-range surface plasmons in asymmetric layered metal-dielectric structures

Design and fabrication of an all-dielectric grating with top-hat high diffraction efficiency over a broad spectral range

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