Sergey Mironov
Russian Academy of Sciences
5 Papers
37 Citations
Sergey Mironov is an academic researcher from Russian Academy of Sciences. The author has contributed to research in topics: Femtosecond pulse shaping & Laser. The author has an hindex of 2, co-authored 5 publications.
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Papers
Second-Harmonic Generation of Super Powerful Femtosecond Pulses Under Strong Influence of Cubic Nonlinearity
Sergey Mironov,Vladimir Lozhkarev,Vladislav Ginzburg,Ivan V. Yakovlev,G.A. Luchinin,Andrey Shaykin,Efim Khazanov,A. A. Babin,E. Novikov,S. Fadeev,Alexander M. Sergeev,Gerard Mourou +11 more
TL;DR: In this article, a theoretical model of second-harmonic generation under strong influence of cubic nonlinearity was verified in experiment and the double-pass geometry of SHG in an ultrathin crystal on a substrate was discussed in detail.
52
Induced modulation of a chirped laser pulse at terahertz frequency with spectral phase shaping
M. A. Martyanov,Andrey Perminov,Igor Kuzmin,Anatoly Poteomkin,Mikhail Krasilnikov,Sergey Mironov +5 more
TL;DR: In this paper, the possibility of using harmonic modulation of the spectral phase to generate multiple replicas of the original short laser pulse or controlled periodic intensity modulation at the terahertz frequency of the stretched chirped laser pulse is shown theoretically and experimentally.
4
Fiber laser with random-access pulse train profiling for a photoinjector driver
E. I. Gacheva,Anatoly Poteomkin,Sergey Mironov,Viktor V. Zelenogorskii,Efim Khazanov,Konstantin B. Yushkov,Alexander I. Chizhikov,Vladimir Ya. Molchanov +7 more
TL;DR: In this article, a fiber laser system with adaptive acousto-optic macropulse control for a novel photocathode laser driver with 3D ellipsoidal pulse shaping is presented.
4
Second Harmonic Generation under Strong Influence of Dispersion and Cubic Nonlinearity Effects
Vladimir Lozhkarev,Vladislav Ginzburg,Ivan V. Yakovlev,G.A. Luchinin,Efim A. Khazanov,Alexander M. Sergeev,G. Mourou,Sergey Mironov +7 more
- 30 Dec 2010
TL;DR: In this paper, Lozhkarev et al. proposed a model of linear stage of plane wave instability in media with quadratic and cubic nonlinearity, where cubic polarization and dispersion effects are taken into account in the theoretical model.