"RIV/61989592:15310/05:00002220!RIV06-MSM-15310___" . "Kvantov\u00E1n\u00ED elektromagnetick\u00E9ho pole v jednoos\u00FDch krystalick\u00FDch dielektrick\u00FDch prost\u0159ed\u00EDch v dlouhovlnn\u00E9 limit\u011B."@cs . . "1464-4266" . "[E383A33ACD4B]" . . "RIV/61989592:15310/05:00002220" . . . "17" . "GB - Spojen\u00E9 kr\u00E1lovstv\u00ED Velk\u00E9 Brit\u00E1nie a Severn\u00EDho Irska" . "Quantization of the electromagnetic field in uniaxial crystalline dielectric media: long-wave limit" . . "Quantization of the electromagnetic field in uniaxial crystalline dielectric media: long-wave limit"@en . . . "539841" . . "8" . . . "Kvantov\u00E1n\u00ED elektromagnetick\u00E9ho pole v jednoos\u00FDch krystalick\u00FDch dielektrick\u00FDch prost\u0159ed\u00EDch v dlouhovlnn\u00E9 limit\u011B."@cs . . "15310" . . . . "P(LN00A015), Z(MSM 153100009)" . "Roz\u0161\u00ED\u0159ili jsme Huttnerovu-Barnettovu teorii vyvinutou pro opticky isotropn\u00ED prost\u0159ed\u00ED. Odvodili jsme tenzor permitivity anisotropn\u00EDho prost\u0159ed\u00ED na z\u00E1klad\u011B tot\u00E1ln\u00EDho hamiltoni\u00E1nu elektromagnetick\u00E9ho pole a l\u00E1tky."@cs . . "The derivation of the relative electric permittivity tensor from a fully classical model is known, and a calculation of this quantity from a semiclassical model in the first order of perturbation theory is familiar as well. In applications to commonly occurring uniaxial crystalline media without optical activity, the whole discrete lattice is represented by a single atomic oscillator. We calculate the relative electric permittivity tensor provided that the discrete lattice can be represented by a continuum of quantum harmonic oscillators." . "11"^^ . . "2"^^ . "Pe\u0159inov\u00E1, Vlasta" . "light propagation in dielectrics; Hopfield model of a dielectric; Kramers-Kronig relations"@en . "Quantization of the electromagnetic field in uniaxial crystalline dielectric media: long-wave limit"@en . "Quantization of the electromagnetic field in uniaxial crystalline dielectric media: long-wave limit" . "The derivation of the relative electric permittivity tensor from a fully classical model is known, and a calculation of this quantity from a semiclassical model in the first order of perturbation theory is familiar as well. In applications to commonly occurring uniaxial crystalline media without optical activity, the whole discrete lattice is represented by a single atomic oscillator. We calculate the relative electric permittivity tensor provided that the discrete lattice can be represented by a continuum of quantum harmonic oscillators."@en . "Luk\u0161, Anton\u00EDn" . "2"^^ . "201-211" . "Journal of Optics B: Quantum and Semiclassical Optics" . . .