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Detailed derivation of the generalized Snell–Descartes laws from Fermat’s principle

Emmanuel Rousseau, Didier Felbacq

2023Journal of the Optical Society of America A15 citationsDOIOpen Access PDF

Abstract

Beginning with Fermat's principle, we provide a detailed derivation of the generalized laws of refraction and reflection for a geometry realizing a metasurface. We first solve the Euler-Lagrange equations for a light ray propagating across the metasurface. The ray-path equation is found analytically, and the results are supported by numerical calculations. We get generalized laws of refraction and reflection that have three main features: (i) They are relevant in gradient-index optics and in geometrical optics; (ii) A collection of rays emerges from the metasurface as a result of multiple reflections inside the metasurface; and (iii) The laws, although derived from Fermat's principle, differ from previously published results.

Topics & Concepts

Fermat's Last TheoremSnell's lawReflection (computer programming)Geometrical opticsPhysicsRefractionEuler's formulaClassical mechanicsOpticsMathematicsMathematical analysisComputer sciencePure mathematicsProgramming languageMetamaterials and Metasurfaces ApplicationsThermal Radiation and Cooling TechnologiesOrbital Angular Momentum in Optics
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