Modal analysis method to describe weak nonlinear effects in metamaterials

Zeng, Yong; Dalvit, Diego A. R.; O’Hara, John F.; Trugman, S. A.

doi:10.1103/physrevb.85.125107

Cited by 19 publications

(21 citation statements)

References 59 publications

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“…Hence, in the presence of DD interaction, one can get a bright soliton even for positive (repulsive) contact interaction (a > 0), which can be controlled by means of the Feshbach resonance with a tunable time-dependent magnetic field [33,34]. Further, in recent years, study of temporal and spatial modulated nonlinearities have attracted considerable attention in several areas, for example, nonlinear physics [41], optics [42][43][44] and conventional BECs [45,46,48,49].…”

Section: Introductionmentioning

confidence: 99%

Stabilization of trapless dipolar Bose-Einstein condensates by temporal modulation of the contact interaction

Sabari

Dey

2018

Phys. Rev. E

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We theoretically study the stability of a trapless dipolar Bose-Einstein condensate (BEC) with temporal modulation of short-range contact interaction. For this aim, through both analytical and numerical methods, we solve a Gross-Pitaevskii equation with both constant and oscillatory form of short-range contact interaction along with long-range, nonlocal, dipole-dipole (DD) interaction terms. Using variational method, we discuss the stability of the trapless dipolar BEC with presence and absence of both constant and oscillatory contact interactions. We show that the oscillatory contact interaction prevents the collapse of the trapless dipolar BEC. We confirm the analytical prediction through numerical simulations. We have also studied the collective excitations in the system induced by the effective potential due to oscillating interaction. PACS numbers: 03.75.-b, 05.45.-a, 05.45.Yv, 03.75.Lm

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Section: Introductionmentioning

confidence: 99%

Stabilization of trapless dipolar Bose-Einstein condensates by temporal modulation of the contact interaction

Sabari

Dey

2018

Phys. Rev. E

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“…However, in many systems of interest, the required criteria for homogenizability are not satisfied, either because the metaatoms are not sufficiently sub-wavelength, the arrays are so small that boundary effects and radiation losses are very strong, or the arrangement is not periodic. As an alternative to homogenization, it is possible to consider the fields of a metamaterial's Bloch modes as the fundamental degrees of freedom 2 , however this suffers from many of the same limitations. In many cases the modes of individual resonators form a much more convenient basis to study the behavior of meta-atoms and resonant scatterers, since the number of excited modes is typically small.…”

Section: Introductionmentioning

confidence: 99%

Resonant dynamics of arbitrarily shaped meta-atoms

Powell

2014

Phys. Rev. B

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Meta-atoms, nano-antennas, plasmonic particles and other small scatterers are commonly modeled in terms of their modes. However these modal solutions are seldom determined explicitly, due to the conceptual and numerical difficulties in solving eigenvalue problems for open systems with strong radiative losses. Here these modes are directly calculated from Maxwell's equations expressed in integral operator form, by finding the complex frequencies which yield a homogenous solution. This gives a clear physical interpretation of the modes, and enables their conduction or polarization current distribution to be calculated numerically for particles of arbitrary shape. By combining the modal current distribution with a scalar impedance function, simple yet accurate models of scatterers are constructed which describe their response to an arbitrary incident field over a broad bandwidth. These models generalize both equivalent-dipole and and equivalent-circuit models to finite sized structures with multiple modes. They are applied here to explain the frequency-splitting for a pair of coupled split rings, and the accompanying change in radiative losses. The approach presented in this paper is made available in an open-source code.

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“…A number of theoretical approaches [6][7][8][9][10][11][12] have been presented in the past for calculating nonlinear coefficients of periodic structures. Analytical 6,7,11 and semi-analytical 10,12 approaches are most suited for scenarios where a subwavelength unit cell consists of spatially slow-varying structures or the wavelengths of interest are significantly larger than the unit cell.…”

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confidence: 99%

“…Analytical 6,7,11 and semi-analytical 10,12 approaches are most suited for scenarios where a subwavelength unit cell consists of spatially slow-varying structures or the wavelengths of interest are significantly larger than the unit cell. It will be shown that a numerical method is necessary to accurately model the SHG behavior of these periodic structures since a small geometrical modification of the unit cell can have a much stronger influence on it than linear optical properties.…”

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confidence: 99%

Phase matching for surface plasmon enhanced second harmonic generation in a gold grating slab

Luong

Cheng

Shih

et al. 2012

Applied Physics Letters

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Surface plasmon enhanced second harmonic generation in gold grating slabs was investigated. The efficiency is analyzed with respect to the phase matching at the fundamental and the second harmonic frequencies. A classical electromagnetic model was developed under the weak nonlinearity approximation and solved by the finite element method. The measured zeroth order transmitted second harmonic intensity was found to be in quantitative agreement with numerical results. It is shown experimentally and numerically that proper phase matching at both frequencies improves the second harmonic efficiency.

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Modal analysis method to describe weak nonlinear effects in metamaterials

Cited by 19 publications

References 59 publications

Stabilization of trapless dipolar Bose-Einstein condensates by temporal modulation of the contact interaction

Stabilization of trapless dipolar Bose-Einstein condensates by temporal modulation of the contact interaction

Resonant dynamics of arbitrarily shaped meta-atoms

Phase matching for surface plasmon enhanced second harmonic generation in a gold grating slab

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