Y
Yuri S. Kivshar
Researcher at Australian National University
Publications - 1876
Citations - 94737
Yuri S. Kivshar is an academic researcher from Australian National University. The author has contributed to research in topics: Nonlinear system & Metamaterial. The author has an hindex of 126, co-authored 1845 publications receiving 79415 citations. Previous affiliations of Yuri S. Kivshar include Technische Universität Darmstadt & Los Alamos National Laboratory.
Papers
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Creation of nonlinear localized modes in discrete lattices.
TL;DR: It is pointed out that modulational instability and nonlinearity-induced blowup may be considered as two main physical mechanisms for generation of highly localized modes in homogeneous nonlinear chains.
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Discrete surface solitons in two-dimensional anisotropic photonic lattices
TL;DR: In this article, nonlinear surface modes in two-dimensional anisotropic periodic photonic lattices were studied and it was shown that, in contrast to one-dimensional discrete surface solitons, the mode threshold power is lower at the surface.
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Coupled-mode theory for spatial gap solitons in optically induced lattices.
TL;DR: Two systems of coupled-mode equations for spatial gap solitons in one-dimensional and quasi-one-dimensional photonic lattices induced by two interfering optical beams in a nonlinear photorefractive crystal are derived.
Journal Article
Band-gap Engineering and Defect Modes in Photonic Crystals with Rotated Hexagonal Holes
TL;DR: In this paper, the authors studied the band gap structure of two-dimensional photonic crystals created by a triangular lattice of rotated hexagonal holes and explored the effects of the reduced symmetry in the unit-cell geometry on the value of the absolute band gap and the frequencies of localized defect modes.
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Band structure of photonic crystals fabricated by two-photon polymerization
Mikhail V. Rybin,Ivan I. Shishkin,Kirill B. Samusev,Pavel A. Belov,Yuri S. Kivshar,Roman Kiyan,Boris N. Chichkov,Mikhail F. Limonov +7 more
TL;DR: In this article, the authors proposed a method to solve the problem of the Russian UCL problem with the assistance of the Government of theRussian Federation (grant 074-UOl) and Russian Foundations for Basic Research (GRF 14-29-10172).