A terahertz metamaterial with unnaturally high refractive index

Choi, Muhan; Kim, Yushin; Kang, Seung Beom; Shin, Jonghwa; Kwak, Min Hwan; Kang, Kwang‐Yong; Lee, Jun Young; Park, Namkyoo; Min, Bumki

doi:10.1038/nature09776

Cited by 577 publications

(343 citation statements)

References 30 publications

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“…Type 15 metamaterials achieve a more complicated and undesirable response compared to Type 50 (50µm thick) metamaterials. Although this may often be an unplanned interaction, this effect has been utilized in some cases to achieve unit cells with both electric and magnetic response 24,[34][35][36][37] . Other examples include electromagnetic inducted transparency 38 and energy level hybridization [39][40][41] .…”

Section: Discussionmentioning

confidence: 99%

Single-layer terahertz metamaterials with bulk optical constants

et al. 2012

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We investigate the conditions under which single layer metamaterials may be described by bulk optical constants. Terahertz time domain spectroscopy is utilized to investigate two types of geometries, both with two different sizes of embedding dielectric -cubic and tetragonal unit cells. The tetragonal metamaterials are shown to yield layer dependent optical constants, whereas the cubic metamaterials yielded layer independent optical constants. We establish guidelines for when ǫ and µ can be used as material parameters for single layer metamaterials. Experimental results at terahertz frequencies are presented and supported by full wave three dimensional electromagnetic simulations.

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Section: Discussionmentioning

confidence: 99%

Single-layer terahertz metamaterials with bulk optical constants

et al. 2012

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“…The vector field v, the carrier, shall be chosen such that the remaining two equations (30) and (31), too, can be solved. Such a choice will be possible if the response functions depend only on one spatial variable, say ζ , as declared in (15), and thus…”

Section: Triple Curl Againmentioning

confidence: 99%

Electromagnetic Waves in Variable Media

Brösa

2012

Zeitschrift Für Naturforschung A

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Two methods are explained to exactly solve Maxwell's equations where permittivity, permeability, and conductivity may vary in space. In the constitutive relations, retardation is regarded. If the material properties depend but on one coordinate, general solutions are derived. If the properties depend on two coordinates, geometrically restricted solutions are obtained. Applications to graded reflectors, especially to dielectric mirrors, to filters, polarizers, and to waveguides, plain and cylindrical, are indicated. New foundations for the design of optical instruments, which are centered around an axis, and for the design of invisibility cloaks, plain and spherical, are proposed. The variability of material properties makes possible effects which cannot happen in constant media, e.g. stopping the flux of electromagnetic energy without loss. As a consequence, spherical devices can be constructed which bind electromagnetic waves. Exact Solutions of Maxwell's EquationsThis work originated from a scrutiny for the foundations of quantum mechanics. Do the equations, which Schrödinger considered as the description of the propagation of light, rest upon Maxwell's equations? The answer is no. The study produced analytic methods for the exact solution of Maxwell's equations even if permittivity, permeability, and conductivity vary in space. These methods should be useful to everyone concerned with electromagnetic fields. Thus readers interested in basic physics might read Section 1.1, whereas technicians may begin with Section 1.2. The Foundations of Quantum MechanicsLet us trace the way Schrödinger walked to find the Schrödinger equation. He thought that the propagation of light, if it is construed as propagation of particles, is best described by the eikonal equationSurfaces of equal eikonal s(r) are perpendicular to the light rays everywhere in the space described by the vector of location r. n(r) is the index of refraction. Schrödinger compared this with the Helmholtz equationwhich he considered as the best description of waves. ω denotes the frequency of that wave and c is the velocity of light. The meaning of ψ is not known. Next Schrödinger remembered that there is an eikonal equation for massive particles, too, the Hamilton-Jacobi equationThe mechanical eikonal S(r) has a similar meaning as in ray optics, but its dimension is different. Hence Schrödinger deduced from a comparison of (1) and (3) a mechanical index of refraction n(r) = c 2 h 2 ω 2m(E −V (r)) .The factor in front of 2m(E − V (r)) is an adjustable constant to get dimensions right. That it is related c 2012 Verlag der Zeitschrift für Naturforschung, Tübingen ·

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“…이러한 메타물질은 자연계에는 존재하지 않는 특이한 성질인 음의 굴절률이나 투명한 형상 등을 탄생시킬 수 있어 다양한 분야에서 연구가 이루어지고 있다 [4,5] . 메타물질을 구현하기 위해서는 그 구 조가 파장 대비 매우 작은 크기로 형성되어야 하므로, 광학 주파수 대역보다는 일반적인 광리소그래피 기술로 메타물질 구현이 가능한 테라헤르츠 대역에서 그 활용도가 크므로 테 라헤르츠 대역에서 메타물질 기반 필터나 센서 등의 소자로 응용하는 연구가 활발히 진행되고 있다 [6,7] . 테라헤르츠 필 터의 컷오프 및 센서의 민감도 향상을 위해서는 메타물질의 품질 인자를 높이는 것이 중요하다.…”

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Electrically Controllable Asymmetric Split-Loop Terahertz Resonator with Outer Square Loop

Park¹,

Ryu²

2017

Korean Journal of Optics and Photonics

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This paper proposes an asymmetric split-loop resonator with an outer square loop (ASLR-OSL), which can actively control terahertz wave transmission properties while maintaining a high-Q-factor of the asymmetric split-loop resonator (ASLR). An added outer square loop is designed to play the roles of both a metamaterial and a micro-heater, which can control the temperature through a directly applied bias voltage. A vanadium dioxide (VO2) thin film, which exhibits an insulator-metal phase transition with temperature change, is used to control the transmission properties. The proposed ASLR-OSL shows transmission properties similar to those of the ASLR, and they can be successfully controlled by directly applying bias voltage to the outer square loop. Based on these results, an electrically controllable terahertz high-Q metamaterial could be achieved simply by adding a square loop to the outside of a well-known high-Q metamaterial.

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A terahertz metamaterial with unnaturally high refractive index

Cited by 577 publications

References 30 publications

Single-layer terahertz metamaterials with bulk optical constants

Single-layer terahertz metamaterials with bulk optical constants

Electromagnetic Waves in Variable Media

Electrically Controllable Asymmetric Split-Loop Terahertz Resonator with Outer Square Loop

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