Y
Yaroslav V. Kartashov
Researcher at Russian Academy of Sciences
Publications - 511
Citations - 13428
Yaroslav V. Kartashov is an academic researcher from Russian Academy of Sciences. The author has contributed to research in topics: Soliton & Nonlinear system. The author has an hindex of 54, co-authored 487 publications receiving 11174 citations. Previous affiliations of Yaroslav V. Kartashov include Moscow State University & University of Bath.
Papers
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Journal ArticleDOI
Solitons in nonlinear lattices
TL;DR: In this paper, a comprehensive survey of results obtained for solitons and complex nonlinear wave patterns supported by nonlinear lattices is presented, with emphasis on perspectives for implementation of the theoretical predictions in the experiment.
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Solitons in PT-symmetric nonlinear lattices
TL;DR: The existence of localized modes supported by the PT-symmetric nonlinear lattices is reported in this article, and the system considered reveals unusual properties: unlike other typical dissipative systems, it possesses families (branch) of solutions, which can be parametrized by the propagation constant.
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Frontiers in multidimensional self-trapping of nonlinear fields and matter
TL;DR: In this paper, a review of the state-of-the-art in this field can be found, including non-Kerr nonlinearities, spin-orbit coupling and quantum fluctuations, among others.
Book ChapterDOI
Soliton Shape and Mobility Control in Optical Lattices
TL;DR: In this article, a progress overview focused on the recent theoretical and experimental advances in the area of soliton manipulation in optical lattices is presented, where the authors consider reconfigurable optically-induced lattices as well as waveguide arrays made in suitable nonlinear materials.
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Surface gap solitons.
TL;DR: The existence of surface gap solitons at the interface between uniform media and an optical lattice with defocusing nonlinearity is put forward and it is discovered that gap surfacesolitons exist only when the lattice depth exceeds a threshold value, and that they can be made completely stable and form stable bound states.