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Статті в журналах з теми "Electromagnetic dispersive media"

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Автор: Grafiati
Опубліковано: 1 червня 2024

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1

Hillion, P. "Electromagnetic Pulses in Dispersive Media." Progress In Electromagnetics Research 18 (1998): 245–60. http://dx.doi.org/10.2528/pier97050700.

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2

Hillion, P. "Electromagnetic Pulses in Dispersive Media." Journal of Electromagnetic Waves and Applications 12, no. 5 (January 1998): 587. http://dx.doi.org/10.1163/156939398x00133.

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3

Phelps, A. D. R. "Electromagnetic Processes in Dispersive Media." Journal of Modern Optics 40, no. 1 (January 1993): 183. http://dx.doi.org/10.1080/09500349314550171.

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4

Cairns, R. A. "Electromagnetic Process in Dispersive Media." Journal of Modern Optics 40, no. 11 (November 1993): 2311. http://dx.doi.org/10.1080/09500349314552311.

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5

Hillion, P. "Electromagnetic Pulse Propagation in Dispersive Media." Progress In Electromagnetics Research 35 (2002): 299–314. http://dx.doi.org/10.2528/pier02021703.

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6

Jiang, Yimin, and Mario Liu. "Electromagnetic force in dispersive and transparent media." Physical Review E 58, no. 5 (November 1, 1998): 6685–94. http://dx.doi.org/10.1103/physreve.58.6685.

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7

Crenshaw, Michael E. "Electromagnetic energy in dispersive magnetodielectric linear media." Journal of Physics B: Atomic, Molecular and Optical Physics 39, no. 1 (December 5, 2005): 17–25. http://dx.doi.org/10.1088/0953-4075/39/1/003.

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8

Beezley, R. S., and R. J. Krueger. "An electromagnetic inverse problem for dispersive media." Journal of Mathematical Physics 26, no. 2 (February 1985): 317–25. http://dx.doi.org/10.1063/1.526661.

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9

Hillion, P. "Electromagnetic Pulse Propagation in Dispersive Media - Abstract." Journal of Electromagnetic Waves and Applications 16, no. 10 (January 2002): 1393–94. http://dx.doi.org/10.1163/156939302x00039.

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10

Capsalis, C. N., N. K. Uzunoglu, and D. J. Frantzeskakis. "PROPAGATION OF ELECTROMAGNETIC WAVES IN NONLINEAR DISPERSIVE MEDIA." Electromagnetics 9, no. 3 (January 1989): 273–80. http://dx.doi.org/10.1080/02726348908915239.

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11

Gratus, Jonathan, and Matthew McCormack. "Spatially dispersive inhomogeneous electromagnetic media with periodic structure." Journal of Optics 17, no. 2 (January 30, 2015): 025105. http://dx.doi.org/10.1088/2040-8978/17/2/025105.

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12

von Wolfersdorf, L. "On an electromagnetic inverse problem for dispersive media." Quarterly of Applied Mathematics 49, no. 2 (January 1, 1991): 237–46. http://dx.doi.org/10.1090/qam/1106390.

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13

Bradshaw, Douglas H., Zhimin Shi, Robert W. Boyd, and Peter W. Milonni. "Electromagnetic momenta and forces in dispersive dielectric media." Optics Communications 283, no. 5 (March 2010): 650–56. http://dx.doi.org/10.1016/j.optcom.2009.10.056.

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14

Fridén, Jonas, Gerhard Kristensson, and Rodney D. Stewart. "Transient electromagnetic wave propagation in anisotropic dispersive media." Journal of the Optical Society of America A 10, no. 12 (December 1, 1993): 2618. http://dx.doi.org/10.1364/josaa.10.002618.

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15

Tang, Miaomiao, Daomu Zhao, Yingbin Zhu, and Lay-Kee Ang. "Electromagnetic sinc Schell-model pulses in dispersive media." Physics Letters A 380, no. 5-6 (February 2016): 794–97. http://dx.doi.org/10.1016/j.physleta.2015.11.027.

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16

Nunes, Frederico Dias, Thiago Campos Vasconcelos, Marcel Bezerra, and John Weiner. "Electromagnetic energy density in dispersive and dissipative media." Journal of the Optical Society of America B 28, no. 6 (May 25, 2011): 1544. http://dx.doi.org/10.1364/josab.28.001544.

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17

Oraevsky, V. N., and V. B. Semikoz. "The Electrodynamics of Neutrinos in Dispersive Media." Symposium - International Astronomical Union 142 (1990): 35–38. http://dx.doi.org/10.1017/s0074180900087660.

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Анотація:
Neutrinos interacting with the vacuum of vector bosons and leptons possess important vacuum electromagnetic characteristics: viz., the anomalous magnetic moment Δμvacν and the mean-square radius of charge distribution <r2>1/2. As a result, neutrinos, just like neutrons, may interact with an external magnetic field.
18

YANYUSHKINA, NATALIA N., MIKHAIL B. BELONENKO, NIKOLAY G. LEBEDEV, ALEXANDER V. ZHUKOV, and MAXIM PALIY. "EXTREMELY SHORT OPTICAL PULSES IN CARBON NANOTUBES IN DISPERSIVE NONMAGNETIC DIELECTRIC MEDIA." International Journal of Modern Physics B 25, no. 25 (October 10, 2011): 3401–8. http://dx.doi.org/10.1142/s0217979211101818.

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Анотація:
We consider Maxwell equations for an electromagnetic field propagating in carbon nanotubes (CNTs) placed on a dispersive nonmagnetic dielectric medium. We obtain the effective equation analogous to the classical sine-Gordon equation. Then it has been analyzed numerically. We have revealed the dependence of the pulse on the type of CNT and on the initial pulse amplitude, as well as on the medium dispersion constants.
19

Bia, Pietro, Luciano Mescia, and Diego Caratelli. "Fractional Calculus-Based Modeling of Electromagnetic Field Propagation in Arbitrary Biological Tissue." Mathematical Problems in Engineering 2016 (2016): 1–11. http://dx.doi.org/10.1155/2016/5676903.

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The interaction of electromagnetic fields and biological tissues has become a topic of increasing interest for new research activities in bioelectrics, a new interdisciplinary field combining knowledge of electromagnetic theory, modeling, and simulations, physics, material science, cell biology, and medicine. In particular, the feasibility of pulsed electromagnetic fields in RF and mm-wave frequency range has been investigated with the objective to discover new noninvasive techniques in healthcare. The aim of this contribution is to illustrate a novel Finite-Difference Time-Domain (FDTD) scheme for simulating electromagnetic pulse propagation in arbitrary dispersive biological media. The proposed method is based on the fractional calculus theory and a general series expansion of the permittivity function. The spatial dispersion effects are taken into account, too. The resulting formulation is explicit, it has a second-order accuracy, and the need for additional storage variables is minimal. The comparison between simulation results and those evaluated by using an analytical method based on the Fourier transformation demonstrates the accuracy and effectiveness of the developed FDTD model. Five numerical examples showing the plane wave propagation in a variety of dispersive media are examined.
20

He, Sailing, and Vaughan H. Weston. "Three-dimensional electromagnetic inverse scattering for biisotropic dispersive media." Journal of Mathematical Physics 38, no. 1 (January 1997): 182–95. http://dx.doi.org/10.1063/1.531849.

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21

Egorov, Igor, Gerhard Kristensson, and Vaughan H. Weston. "Transient electromagnetic wave propagation in laterally discontinuous, dispersive media." Wave Motion 33, no. 1 (January 2001): 67–77. http://dx.doi.org/10.1016/s0165-2125(00)00064-0.

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22

Mostafazadeh, Ali. "Pseudo-Hermiticity and electromagnetic wave propagation in dispersive media." Physics Letters A 374, no. 11-12 (March 2010): 1307–10. http://dx.doi.org/10.1016/j.physleta.2010.01.013.

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23

Dai, Yuyao, Yu Xuanyuan, and Jiangwei Chen. "Stored energy density of electromagnetic wave in dispersive media." Optik 206 (March 2020): 163999. http://dx.doi.org/10.1016/j.ijleo.2019.163999.

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24

Nguyen, Hoai-Minh, and Valentin Vinoles. "Electromagnetic wave propagation in media consisting of dispersive metamaterials." Comptes Rendus Mathematique 356, no. 7 (July 2018): 757–75. http://dx.doi.org/10.1016/j.crma.2018.05.012.

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25

Jang, Sangeun, Jae-Woo Baek, Jeahoon Cho, and Kyung-Young Jung. "Unified GSTC-FDTD Algorithm for the Efficient Electromagnetic Analysis of 2D Dispersive Materials." Journal of Electromagnetic Engineering and Science 23, no. 5 (September 30, 2023): 423–28. http://dx.doi.org/10.26866/jees.2023.5.r.187.

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Анотація:
The finite-difference time-domain (FDTD) method has been widely used for the electromagnetic wave analysis of complex media. Conventional FDTD analyses of very thin two-dimensional (2D) dispersive materials require overwhelming computing resources because they should use very refined FDTD spatial grids. In this work, we propose a computationally efficient and unified FDTD formulation for 2D dispersive materials based on a combination of the generalized sheet transition condition (GSTC) and the modified Lorentz dispersion model. The proposed FDTD formulation can lead to a significant improvement in computational efficiency compared to the conventional FDTD method, while maintaining high accuracy. Numerical examples validate the improved computational efficiency of the proposed FDTD formulation.
26

Toptygin, I. N., and K. Levina. "Energy—momentum tensor of the electromagnetic field in dispersive media." Uspekhi Fizicheskih Nauk 186, no. 2 (2016): 146–58. http://dx.doi.org/10.3367/ufnr.0186.201602c.0146.

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27

de Hoop, Adrianus T. "Time-domain reciprocity theorems for electromagnetic fields in dispersive media." Radio Science 22, no. 7 (December 1987): 1171–78. http://dx.doi.org/10.1029/rs022i007p01171.

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28

Siushansian, R., and J. LoVetri. "A comparison of numerical techniques for modeling electromagnetic dispersive media." IEEE Microwave and Guided Wave Letters 5, no. 12 (1995): 426–28. http://dx.doi.org/10.1109/75.481849.

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29

Roberts, Thomas M., and Peter G. Petropoulos. "Asymptotics and energy estimates for electromagnetic pulses in dispersive media." Journal of the Optical Society of America A 13, no. 6 (June 1, 1996): 1204. http://dx.doi.org/10.1364/josaa.13.001204.

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30

Coelho, V. A., F. S. S. Rosa, Reinaldo de Melo e Souza, C. Farina, and M. V. Cougo-Pinto. "An Integrodifferential Equation for Electromagnetic Fields in Linear Dispersive Media." Brazilian Journal of Physics 49, no. 5 (July 8, 2019): 734–37. http://dx.doi.org/10.1007/s13538-019-00683-4.

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31

Janowicz, M. W., J. M. A. Ashbourn, Arkadiusz Orłowski, and Jan Mostowski. "Cellular automaton approach to electromagnetic wave propagation in dispersive media." Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences 462, no. 2074 (April 18, 2006): 2927–48. http://dx.doi.org/10.1098/rspa.2006.1701.

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Анотація:
Extensions of Białynicki-Birula's cellular automaton are proposed for studies of the one-dimensional propagation of electromagnetic fields in Drude metals, as well as in both transparent, dispersive and lossy dielectrics. These extensions are obtained by representing the dielectrics with appropriate matter fields, such as polarization together with associated velocity fields. To obtain the different schemes for the integration of the resulting systems of linear partial differential equations, split-operator ideas are employed. Possible further extensions to two-dimensional propagation and for the study of left-handed materials are discussed. The stability properties of the cellular automaton treated as a difference scheme are analysed.
32

Toptygin, I. N., and K. Levina. "Energy-momentum tensor of the electromagnetic field in dispersive media." Physics-Uspekhi 59, no. 2 (February 28, 2016): 141–52. http://dx.doi.org/10.3367/ufne.0186.201602c.0146.

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33

Dvorak, S. L., and D. G. Dudley. "Propagation of ultra-wide-band electromagnetic pulses through dispersive media." IEEE Transactions on Electromagnetic Compatibility 37, no. 2 (May 1995): 192–200. http://dx.doi.org/10.1109/15.385883.

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34

Kostic, Milos, Nebojsa Doncov, Zoran Stankovic, and John Paul. "Numerical compact modeling approach of dispersive magnetoelectric media based on scattering parameters." Facta universitatis - series: Electronics and Energetics 33, no. 1 (2020): 73–82. http://dx.doi.org/10.2298/fuee2001073k.

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Анотація:
Z-TLM based compact modeling approach for dispersive media exhibiting magnetoelectric coupling is presented in this paper. Scattering parameters based representation of considered medium is created in a form of compact model by extracting effective electromagnetic parameters using a retrieval method, and implementing them into a non-uniform TLM grid. Proposed approach is illustrated here on the example of dispersive isotropic chiral medium modeling.
35

Tan, Kang Bo, Yi Chao Song, Tao Su, F. F. Fan, and Hong Min Lu. "Efficient Analysis of the Electromagnetic Energy in Dispersive Composite Materials." Applied Mechanics and Materials 423-426 (September 2013): 93–96. http://dx.doi.org/10.4028/www.scientific.net/amm.423-426.93.

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This paper presents an analysis for electromagnetic energy in dispersive composite media based on classical electrodynamics. An investigation of the relation between reactance rate and electromagnetic energy derived from the Fosters theorem is conducted. The material energy of this kind is discussed in the frequency band of the left handed property. It is illustrated that the time average electromagnetic energy density is still positive even after an effect of dissipation is cancelled in the left handed band, which is reasonable in physics.
36

Yu, Guanxia, Jingjing Fu, Xiaomeng Zhang, and Ruoyu Cao. "Nonreciprocal Transmission of Electromagnetic Waves Using an Electric–Gyrotropic Dispersive Medium." Zeitschrift für Naturforschung A 75, no. 1 (December 18, 2019): 81–88. http://dx.doi.org/10.1515/zna-2019-0120.

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AbstractA nonreciprocal transmission structure is designed using a one-dimension multilayer medium, which consists of two asymmetric structure filled with the electric–gyrotropic dispersive media. The total transmission coefficients have been deduced using the transfer matrix method. Numerical results further provided evidence for the occurrence of the nonreciprocal surface electromagnetic waves. These states are affected by the thickness of layers, incident angles, and the externally applied magnetic fields. Given that the electric–gyrotropic media are inherently dispersive, our investigations will contribute to the practical application of nonreciprocal structures.
37

Prokopidis, Konstantinos P., and Dimitrios C. Zografopoulos. "Time-Domain Studies of General Dispersive Anisotropic Media by the Complex-Conjugate Pole–Residue Pairs Model." Applied Sciences 11, no. 9 (April 23, 2021): 3844. http://dx.doi.org/10.3390/app11093844.

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A novel finite-difference time-domain formulation for the modeling of general anisotropic dispersive media is introduced in this work. The method accounts for fully anisotropic electric or magnetic materials with all elements of the permittivity and permeability tensors being non-zero. In addition, each element shows an arbitrary frequency dispersion described by the complex-conjugate pole–residue pairs model. The efficiency of the technique is demonstrated in benchmark numerical examples involving electromagnetic wave propagation through magnetized plasma, nematic liquid crystals and ferrites.
38

Choi, Hongjin, Jeahoon Cho, Yong Bae Park, and Kyung-Young Jung. "Newmark-FDTD Formulation for Modified Lorentz Dispersive Medium and Its Equivalence to Auxiliary Differential Equation-FDTD with Bilinear Transformation." International Journal of Antennas and Propagation 2019 (June 20, 2019): 1–7. http://dx.doi.org/10.1155/2019/4173017.

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Анотація:
The finite-difference time-domain (FDTD) method has been popularly utilized to analyze the electromagnetic (EM) wave propagation in dispersive media. Various dispersion models were introduced to consider the frequency-dependent permittivity, including Debye, Drude, Lorentz, quadratic complex rational function, complex-conjugate pole-residue, and critical point models. The Newmark-FDTD method was recently proposed for the EM analysis of dispersive media and it was shown that the proposed Newmark-FDTD method can give higher stability and better accuracy compared to the conventional auxiliary differential equation- (ADE-) FDTD method. In this work, we extend the Newmark-FDTD method to modified Lorentz medium, which can simply unify aforementioned dispersion models. Moreover, it is found that the ADE-FDTD formulation based on the bilinear transformation is exactly the same as the Newmark-FDTD formulation which can have higher stability and better accuracy compared to the conventional ADE-FDTD. Numerical stability, numerical permittivity, and numerical examples are employed to validate our work.
39

Tan, K. B., and C. H. Liang. "Generalized Electromagnetic Energy Density in Time-Dependent Composite Media." Advanced Materials Research 160-162 (November 2010): 1151–55. http://dx.doi.org/10.4028/www.scientific.net/amr.160-162.1151.

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The Lorentz medium model for magnetization is modification, through which the whole Lorentz models become more symmetric one than traditional forms used in [3-5]. The modification can also have the deduction for more general Poynting’ theorem in dispersive media became a regular procedure. As an application, those forms of energy density in [4, 5] are special cases of generalized one shown in the letter under the establishment conditions for time-independent situation.
40

Artoni, M., I. Carusotto, G. C. La Rocca, and F. Bassani. "Laser Assisted Cherenkov Emission in Resonant Media." Zeitschrift für Naturforschung A 56, no. 1-2 (February 1, 2001): 169–72. http://dx.doi.org/10.1515/zna-2001-0127.

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Abstract We theoretically examine the behaviour of Cherenkov radiation in a lossy, dispersive and resonant medium when emission is assisted by an external electromagnetic field. Under the appropriate coherence conditions for Cherenkov emission, we anticipate a large increase of the emission yield at resonance. Our predictions are implemented by numerical estimates for cuprous oxide (Cu20 ). Pacs: 61.43.Fs, 77.22.Ch, 75.50.Lk
41

Sabah, Cumali, and Savas Uckun. "Scattering Characteristics of Stratified Double Negative Stacks Using the Frequency Dispersive Cold Plasma Medium." Zeitschrift für Naturforschung A 62, no. 5-6 (June 1, 2007): 247–53. http://dx.doi.org/10.1515/zna-2007-5-603.

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We present the wave propagation through stratified double negative stacks to illustrate the scattering characteristics of their structure. The double negative stacks are modeled by using the hypothetical non-dispersive and the frequency dispersive cold plasma media. The stacks are embedded between two double positive media and the incident electric field is assumed a plane electromagnetic wave with any arbitrary polarization. By imposing the boundary conditions, the relations between the fields inside and outside the stacks can be written in a matrix form. Using this transfer matrix, the incident, reflected, and transmitted powers are derived. The variations of the powers for the stratified double negative stacks using the frequency dispersive cold plasma medium have not been investigated yet, in detail. Thus, their characteristics for the perpendicular polarization is computed and presented in numerical results with the emphasis on the plasma frequencies. It is seen from the numerical results that the stratified double negative stacks can be used as electromagnetic filters at some frequency bands.
42

Krowne, Clifford M., and Maurice Daniel. "Electromagnetic Field Behavior in Dispersive Isotropic Negative Phase Velocity/Negative Refractive Index Guided Wave Structures Compatible with Millimeter-Wave Monolithic Integrated Circuits." Journal of Nanomaterials 2007 (2007): 1–11. http://dx.doi.org/10.1155/2007/54568.

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A microstrip configuration has been loaded with a dispersive isotropic left-handed medium (LHM) substrate and studied regarding its high frequency millimeter-wave behavior near 100 GHz. This has been accomplished using a full-wave integral-equation anisotropic Green's function code configured to run for isotropy. Never before seen electromagnetic field distributions are produced, unlike anything found in normal media devices, using this ab initio solver. These distributions are made in the cross-sectional dimension, with the field propagating in the perpendicular direction. It is discovered that the LHM distributions are so radically different from ordinary media used as a substrate that completely new electronic devices based upon the new physics become a real possibility. The distinctive dispersion diagram for the dispersive medium, consisting of unit cells with split ring resonator-rod combinations, is provided over the upper millimeter-wave frequency regime.
43

Zunoubi, Mohammad R., and Jason Payne. "ANALYSIS OF 3-DIMENSIONAL ELECTROMAGNETIC FIELDS IN DISPERSIVE MEDIA USING CUDA." Progress In Electromagnetics Research M 16 (2011): 185–96. http://dx.doi.org/10.2528/pierm10112506.

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44

I. Montanari, E. Dileo, M. Fabbri and M. Fabbri. "Variational Approach to the Electromagnetic Field Computation in Dielectric Dispersive Media." Electromagnetics 21, no. 2 (February 2001): 139–45. http://dx.doi.org/10.1080/02726340119989.

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45

Montanari, I., E. Dileo, and M. Fabbri. "Variational Approach to the Electromagnetic Field Computation in Dielectric Dispersive Media." Electromagnetics 21, no. 2 (February 1, 2001): 139–45. http://dx.doi.org/10.1080/02726340151134443.

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46

Ramadan, Omar. "Efficient LOD-SC-PML Formulations for Electromagnetic Fields in Dispersive Media." IEEE Microwave and Wireless Components Letters 22, no. 6 (June 2012): 297–99. http://dx.doi.org/10.1109/lmwc.2012.2197819.

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47

Roberts, T. M. "Measured Electromagnetic Pulses Verify Asymptotics and Analysis for Linear, Dispersive Media." Journal of Electromagnetic Waves and Applications 20, no. 13 (January 2006): 1845–51. http://dx.doi.org/10.1163/156939306779292200.

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48

Gorelik, Vladimir, Dongxue Bi, Natalia Klimova, Svetlana Pichkurenko, and Vladimir Filatov. "The electromagnetic field distribution in the 1D layered quasiperiodic dispersive media." Journal of Physics: Conference Series 1348 (December 2019): 012060. http://dx.doi.org/10.1088/1742-6596/1348/1/012060.

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49

Asatryan, A. A., N. A. Nicorovici, L. C. Botten, C. Martijn de Sterke, P. A. Robinson, and R. C. McPhedran. "Electromagnetic localization in dispersive stratified media with random loss and gain." Physical Review B 57, no. 21 (June 1, 1998): 13535–49. http://dx.doi.org/10.1103/physrevb.57.13535.

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50

Rabinovich, Vladimir. "Propagation of electromagnetic waves generated by moving sources in dispersive media." Russian Journal of Mathematical Physics 19, no. 1 (March 2012): 107–20. http://dx.doi.org/10.1134/s1061920812010098.

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