Seog-Hoon Rim scite author profile

We study resonance patterns of a spiral-shaped dielectric microcavity with chaotic ray dynamics. Many resonance patterns of this microcavity, with refractive indices n=2 and 3, exhibit strong localization of simple geometric shape, and we call them quasiscarred resonances in the sense that there is, unlike conventional scarring, no underlying periodic orbits. It is shown that the formation of a quasiscarred pattern can be understood in terms of ray dynamical probability distributions and wave properties like uncertainty and interference.

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Anti-synchronization of chaotic oscillators

Kim

et al. 2003

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On the Analogs of Bernoulli and Euler Numbers, Related Identities and Zeta and L-Functions

Kim¹,

Rim²,

Şimşek³

et al. 2008

Journal of the Korean Mathematical Society

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Unidirectional lasing from a microcavity with a rounded isosceles triangle shape

et al. 2004

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We report that unidirectional lasing emission can be generated from a rounded isosceles triangular microcavity within a low nkD range, where n is the refractive index, k is the vacuum wave number, and D is the characteristic size of the microcavity. It is shown that unidirectional resonance modes have relatively high-Q values and in a nonlinear dynamic model appear as stationary lasing solutions with a low threshold. The formation of a whispering-gallery-type pattern along the rounded part on the symmetry axis is responsible for the unidirectionality of the resonances.

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Umbral calculus and Sheffer sequences of polynomials

Kim

Ким

Mansour

et al. 2013

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Seog-Hoon Rim

Quasiscarred Resonances in a Spiral-Shaped Microcavity

Anti-synchronization of chaotic oscillators

On the Analogs of Bernoulli and Euler Numbers, Related Identities and Zeta and L-Functions

Unidirectional lasing from a microcavity with a rounded isosceles triangle shape

Umbral calculus and Sheffer sequences of polynomials

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