Littérature scientifique sur le sujet « Electromagnetic dispersive media »
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Articles de revues sur le sujet "Electromagnetic dispersive media"
Hillion, P. « Electromagnetic Pulses in Dispersive Media ». Progress In Electromagnetics Research 18 (1998) : 245–60. http://dx.doi.org/10.2528/pier97050700.
Texte intégralHillion, P. « Electromagnetic Pulses in Dispersive Media ». Journal of Electromagnetic Waves and Applications 12, no 5 (janvier 1998) : 587. http://dx.doi.org/10.1163/156939398x00133.
Texte intégralPhelps, A. D. R. « Electromagnetic Processes in Dispersive Media ». Journal of Modern Optics 40, no 1 (janvier 1993) : 183. http://dx.doi.org/10.1080/09500349314550171.
Texte intégralCairns, R. A. « Electromagnetic Process in Dispersive Media ». Journal of Modern Optics 40, no 11 (novembre 1993) : 2311. http://dx.doi.org/10.1080/09500349314552311.
Texte intégralHillion, P. « Electromagnetic Pulse Propagation in Dispersive Media ». Progress In Electromagnetics Research 35 (2002) : 299–314. http://dx.doi.org/10.2528/pier02021703.
Texte intégralJiang, Yimin, et Mario Liu. « Electromagnetic force in dispersive and transparent media ». Physical Review E 58, no 5 (1 novembre 1998) : 6685–94. http://dx.doi.org/10.1103/physreve.58.6685.
Texte intégralCrenshaw, Michael E. « Electromagnetic energy in dispersive magnetodielectric linear media ». Journal of Physics B : Atomic, Molecular and Optical Physics 39, no 1 (5 décembre 2005) : 17–25. http://dx.doi.org/10.1088/0953-4075/39/1/003.
Texte intégralBeezley, R. S., et R. J. Krueger. « An electromagnetic inverse problem for dispersive media ». Journal of Mathematical Physics 26, no 2 (février 1985) : 317–25. http://dx.doi.org/10.1063/1.526661.
Texte intégralHillion, P. « Electromagnetic Pulse Propagation in Dispersive Media - Abstract ». Journal of Electromagnetic Waves and Applications 16, no 10 (janvier 2002) : 1393–94. http://dx.doi.org/10.1163/156939302x00039.
Texte intégralCapsalis, C. N., N. K. Uzunoglu et D. J. Frantzeskakis. « PROPAGATION OF ELECTROMAGNETIC WAVES IN NONLINEAR DISPERSIVE MEDIA ». Electromagnetics 9, no 3 (janvier 1989) : 273–80. http://dx.doi.org/10.1080/02726348908915239.
Texte intégralThèses sur le sujet "Electromagnetic dispersive media"
McCormack, Matthew. « Propagation of electromagnetic waves in spatially dispersive inhomogeneous media ». Thesis, Lancaster University, 2014. http://eprints.lancs.ac.uk/74368/.
Texte intégralRosas, Martinez Luis. « Study of two wave propagation problems in electromagnetic dispersive media : 1) Long-time stability analysis in Drude-Lorentz media ; 2) Transmission between a slab of metamaterial on a dielectric ». Electronic Thesis or Diss., Institut polytechnique de Paris, 2023. http://www.theses.fr/2023IPPAE011.
Texte intégralThis PhD thesis addresses two independent problems related to wave propagation phenomena in dispersive media. In the first part, we investigate the long-time behavior of solutions of Maxwell’s equations in dissipative generalized Drude-Lorentz media. More precisely, we wish to quantify the loss in such media in terms of the decay rate of the electromagnetic energy for the corresponding Cauchy problem. This first part is in turn composed by two approaches. The first one, namely, the frequency dependent Lyapunov approach, consists in deriving a differential inequality (in time) for certain functionals of the solution, the Lyapunov functions L(k), where k is the spatial frequency. The stability estimates are then obtained from the time integration of the differential inequality. By developing this method, we obtain a polynomial stability result under strong dissipative assumptions. The second approach, the modal approach, exploits the spectral properties of the Hamiltonian operator appearing in the Cauchy problem. This last approach ameliorates the first one by considering weak dissipation assumptions. In the second part of the work, we are interested in the transmission problem of a slab of non-dissipative Drude metamaterial within a dielectric. In this context, we consider the TM two dimensional time-dependent Maxwell’s equations and we reformulate it into a Schrödinger equation whose Hamiltonian, A, is a unbounded self-adjoint operator. Fourier transform allow us to work with the reduced Hamiltonians A(k), k ∈ R. Finally, we are interested in the point spectrum of the reduced Hamiltonian which is related to the guided modes of the original problem. This study leads to a diseprsion relation whose difficulty lies in its highly non-linear character with respect to the spectral parameter. We prove the existence of a countable infinity of solution branches for the dispersion relation: the so-called dispersion curves. We give a precise analysis of these curves and enlighten the existence of guided waves which correspond to surface plasmons
Azam, Md Ali. « Wave reflection from a lossy uniaxial media ». Ohio : Ohio University, 1995. http://www.ohiolink.edu/etd/view.cgi?ohiou1179854582.
Texte intégralJaneiro, Fernando M. « Quiralidade e Não-Linearidade em Fibras Ópticas ». Doctoral thesis, IST, 2004. http://hdl.handle.net/10174/2008.
Texte intégralChen, Poting, et 陳博亭. « Lattice Boltzmann Model for Electromagnetic Waves in Dispersive Media ». Thesis, 2011. http://ndltd.ncl.edu.tw/handle/70808340344700971976.
Texte intégral國立中正大學
機械工程學系暨研究所
99
An extended lattice Boltzmann modeling with special forcing terms for one-dimensional Maxwell equations exerting on a dispersive medium is presented in this thesis. The time dependent dispersive effect is obtained by the inverse Fourier transform of the frequency-domain permittivity and is incorporated into the evolution equations of LBM via an equivalent forcing effect. The Chapman-Enskog multi-scale analysis is employed to make sure the proposed scheme is mathematically consistent with the targeted Maxwell’s equations. The numerical accuracy was then confirmed by comparing the LBM results with those from the FDTD. Results show that the numerical values for the frequency-dependent reflection coefficients at the air/water interface as well as the reflection and transmission coefficients at the vacuum/plasma interface obtained by these two methods were all in excellent agreement compared with the exact solutions. The present model can be used for dispersive media described by the Debye, Drude and Lorentz models.
Wang, Yu-Chieh, et 王豫潔. « Prediction of electromagnetic wave propagation in three-dimensional dispersive media ». Thesis, 2014. http://ndltd.ncl.edu.tw/handle/17582476103033237197.
Texte intégral國立臺灣大學
工程科學及海洋工程學研究所
102
An explicit finite-difference scheme for solving the three-dimensional Maxwell''s equations in staggered grids is presented in time domain. The aim of this thesis is to solve the Faraday''s and Ampere''s equations in time domain within the discrete zero-divergence context for the electric and magnetic fields (or Gauss''s law). The local conservation laws in Maxwell''s equations are also numerically preserved all the time using proposed the explicit second-order accurate symplectic partitioned Runge-Kutta temporal scheme. Following the method of lines, the spatial derivative terms in the semi-discretized Faraday''s and Ampere''s equations are then properly discretized to get a dispersively very accurate solution. To achieve the goal of getting the best dispersive characteristics, this centered scheme minimizes the difference between the exact and numerical phase velocities with good rates of convergence are demonstrated for the problem. The significant dispersion and anisotropy errors manifested normally in finite difference time domain methods are therefore much reduced. The dual-preserving (symplecticity and dispersion relation equation) wave solver is numerically demonstrated to be efficient for use to get in particular long-term accurate Maxwell''s solutions. The emphasis of this study is also placed on the accurate modelling of EM waves in the dispersive media of the Debye, Lorentz and Drude types. Through the computational exercises, the proposed dual-preserving solver is computationally demonstrated to be efficient for use to predict the long-term accurate Maxwell''s solutions for the media of frequency independent and dependent types.
Keefer, Olivia A. « Operator splitting methods for Maxwell's equations in dispersive media ». Thesis, 2012. http://hdl.handle.net/1957/30019.
Texte intégralGraduation date: 2012
Access restricted to the OSU Community at author's request from June 20, 2012 - Dec. 20, 2012
Livres sur le sujet "Electromagnetic dispersive media"
Melrose, D. B. Electromagnetic processes in dispersive media : A treatment based on the dielectric tensor. Cambridge [England] : Cambridge University Press, 1991.
Trouver le texte intégralMcPhedran, R. C., et D. B. Melrose. Electromagnetic Processes in Dispersive Media. Cambridge University Press, 2005.
Trouver le texte intégralMcPhedran, R. C., et D. B. Melrose. Electromagnetic Processes in Dispersive Media. Cambridge University Press, 2009.
Trouver le texte intégralMcPhedran, R. C., et D. B. Melrose. Electromagnetic Processes in Dispersive Media. Cambridge University Press, 2011.
Trouver le texte intégralOughstun, Kurt E. Electromagnetic and Optical Pulse Propagation 1 : Spectral Representations in Temporally Dispersive Media. Springer, 2007.
Trouver le texte intégralElectromagnetic And Optical Pulse Propagation 1 Spectral Representations In Temporally Dispersive Media. Springer, 2010.
Trouver le texte intégralOughstun, Kurt E. Electromagnetic and Optical Pulse Propagation 1 : Spectral Representations in Temporally Dispersive Media (Springer Series in Optical Sciences). Springer, 2006.
Trouver le texte intégralOughstun, Kurt E. Electromagnetic and Optical Pulse Propagation 2 : Temporal Pulse Dynamics in Dispersive, Attenuative Media. Springer London, Limited, 2010.
Trouver le texte intégralOughstun, Kurt E. Electromagnetic and Optical Pulse Propagation 2 : Temporal Pulse Dynamics in Dispersive, Attenuative Media. Springer, 2018.
Trouver le texte intégralElectromagnetic and Optical Pulse Propagation 2 : Temporal Pulse Dynamics in Dispersive, Attenuative Media. Springer, 2009.
Trouver le texte intégralChapitres de livres sur le sujet "Electromagnetic dispersive media"
Kamberaj, Hiqmet. « Electromagnetic Waves in Dispersive Media ». Dans Undergraduate Texts in Physics, 359–78. Cham : Springer International Publishing, 2022. http://dx.doi.org/10.1007/978-3-030-96780-2_13.
Texte intégralStancil, Daniel D. « Electromagnetic Waves in Anisotropic Dispersive Media ». Dans Theory of Magnetostatic Waves, 60–88. New York, NY : Springer New York, 1993. http://dx.doi.org/10.1007/978-1-4613-9338-2_3.
Texte intégralStancil, Daniel D., et Anil Prabhakar. « Electromagnetic Waves in Anisotropic-Dispersive Media ». Dans Spin Waves, 111–37. Boston, MA : Springer US, 2009. http://dx.doi.org/10.1007/978-0-387-77865-5_4.
Texte intégralStancil, Daniel D., et Anil Prabhakar. « Electromagnetic Waves in Anisotropic Dispersive Media ». Dans Spin Waves, 67–86. Cham : Springer International Publishing, 2021. http://dx.doi.org/10.1007/978-3-030-68582-9_4.
Texte intégralZhang, Keqian, et Dejie Li. « Chapter 7 Electromagnetic Waves in Dispersive Media ». Dans Electromagnetic Theory for Microwaves and Optoelectronics, 433–52. Berlin, Heidelberg : Springer Berlin Heidelberg, 1998. http://dx.doi.org/10.1007/978-3-662-03553-5_7.
Texte intégralShvartsburg, A. B. « Anharmonic Alternating Electromagnetic Fields in Dispersive Materials ». Dans Impulse Time-Domain Electromagnetics of Continuous Media, 1–35. Boston, MA : Birkhäuser Boston, 1999. http://dx.doi.org/10.1007/978-1-4612-0773-3_1.
Texte intégralDvorak, Steven L., et Donald G. Dudley. « Propagation of UWB Electromagnetic Pulses Through Dispersive Media ». Dans Ultra-Wideband, Short-Pulse Electromagnetics 2, 297–304. Boston, MA : Springer US, 1995. http://dx.doi.org/10.1007/978-1-4899-1394-4_31.
Texte intégralPetropoulos, Peter G. « Wave Hierarchies for Propagation in Dispersive Electromagnetic Media ». Dans Ultra-Wideband, Short-Pulse Electromagnetics 2, 351–54. Boston, MA : Springer US, 1995. http://dx.doi.org/10.1007/978-1-4899-1394-4_37.
Texte intégralOughstun, Kurt E. « Pulsed Electromagnetic and Optical Beam WaveFields in Temporally Dispersive Media ». Dans Springer Series in Optical Sciences, 1–93. New York, NY : Springer New York, 2009. http://dx.doi.org/10.1007/b97737_1.
Texte intégralOughstun, Kurt E. « Pulsed Electromagnetic and Optical Beam WaveFields in Temporally Dispersive Media ». Dans Springer Series in Optical Sciences, 1–93. New York, NY : Springer US, 2009. http://dx.doi.org/10.1007/978-1-4419-0149-1_1.
Texte intégralActes de conférences sur le sujet "Electromagnetic dispersive media"
S. Svetov, B., et V. V. Ageev. « Electromagnetic sounding of frequency dispersive media ». Dans 58th EAEG Meeting. Netherlands : EAGE Publications BV, 1996. http://dx.doi.org/10.3997/2214-4609.201408665.
Texte intégralIOANNIDIS, A. D., I. G. STRATIS et A. N. YANNACOPOULOS. « ELECTROMAGNETIC WAVE PROPAGATION IN DISPERSIVE BIANISOTROPIC MEDIA ». Dans Proceedings of the Sixth International Workshop. WORLD SCIENTIFIC, 2004. http://dx.doi.org/10.1142/9789812702593_0031.
Texte intégralIjjeh, Abdelrahman, Michel M. Ney et Francesco Andriulli. « Dispersion analysis in time-domain simulation of complex dispersive media ». Dans 2015 IEEE MTT-S International Conference on Numerical Electromagnetic and Multiphysics Modeling and Optimization (NEMO). IEEE, 2015. http://dx.doi.org/10.1109/nemo.2015.7415016.
Texte intégralM. Kamenetsky, F., et P. V. Novikov. « Analog-Scale Modelling Transient Electromagnetic Field in Dispersive Media ». Dans 57th EAEG Meeting. Netherlands : EAGE Publications BV, 1995. http://dx.doi.org/10.3997/2214-4609.201409532.
Texte intégralMikki, Said M., et Ahmed A. Kishky. « Electromagnetic wave propagation in dispersive negative group velocity media ». Dans 2008 IEEE MTT-S International Microwave Symposium Digest - MTT 2008. IEEE, 2008. http://dx.doi.org/10.1109/mwsym.2008.4633139.
Texte intégralShubitidze, Ph, R. Jobava, R. Beria, I. Shamatava, R. Zaridze et D. Karkashadze. « Application of FDTD to dispersive media ». Dans Direct and Inverse Problems of Electromagnetic and Acoustic Wave Theory. Proceedings of 4th International Seminar/Workshop. DIPED - 99. IEEE, 1999. http://dx.doi.org/10.1109/diped.1999.822141.
Texte intégralZhang Zihua et Zhong Zhiying. « Effect of chirp on light pulse propagation in dispersive media ». Dans Proceedings of International Symposium on Electromagnetic Compatibility. IEEE, 1997. http://dx.doi.org/10.1109/elmagc.1997.617070.
Texte intégralChen, Penghui, Xiaojian Xu, Qingsheng Zeng et Mustapha C. E. Yagoub. « Time domain analysis of waves in layered lossy dispersive media ». Dans 2012 Asia-Pacific Symposium on Electromagnetic Compatibility (APEMC). IEEE, 2012. http://dx.doi.org/10.1109/apemc.2012.6238019.
Texte intégralV. Novikov, P. « Physical modelling electromagnetic field in dispersive media and criteria of similarity ». Dans 58th EAEG Meeting. Netherlands : EAGE Publications BV, 1996. http://dx.doi.org/10.3997/2214-4609.201408664.
Texte intégralChufo, Robert. « An electromagnetic noncontacting sensor for thickness measurement in a dispersive media ». Dans Conference on Intelligent Robots in Factory, Field, Space, and Service. Reston, Virigina : American Institute of Aeronautics and Astronautics, 1994. http://dx.doi.org/10.2514/6.1994-1200.
Texte intégralRapports d'organisations sur le sujet "Electromagnetic dispersive media"
Banks, H. T., et M. W. Buksas. A Semigroup Formulation for Electromagnetic Waves in Dispersive Dielectric Media. Fort Belvoir, VA : Defense Technical Information Center, novembre 1999. http://dx.doi.org/10.21236/ada446033.
Texte intégralOughstun, Kurt E., et Natalie A. Cartwright. A Research Program on the Asymptotic Description of Electromagnetic Pulse Propagation in Spatially Inhomogeneous, Temporally Dispersive, Attenuative Media. Fort Belvoir, VA : Defense Technical Information Center, septembre 2007. http://dx.doi.org/10.21236/ada474484.
Texte intégralYakura, S. J., et Jeff MacGillivray. Finite-Difference Time-Domain Calculations Based on Recursive Convolution Approach for Propagation of Electromagnetic Waves in Nonlinear Dispersive Media. Fort Belvoir, VA : Defense Technical Information Center, octobre 1997. http://dx.doi.org/10.21236/ada336967.
Texte intégralOughston, Kurt. The Asymptotic Theory of the Reflection and Transmission of a Pulsed Electromagnetic Beam Field at a Planar Interface Separating Two Dispersive Media. Fort Belvoir, VA : Defense Technical Information Center, mars 1993. http://dx.doi.org/10.21236/ada269033.
Texte intégral