N
N. G. Gusein-zade
Researcher at Russian Academy of Sciences
Publications - 12
Citations - 46
N. G. Gusein-zade is an academic researcher from Russian Academy of Sciences. The author has contributed to research in topics: Slot antenna & Dipole antenna. The author has an hindex of 4, co-authored 12 publications receiving 41 citations. Previous affiliations of N. G. Gusein-zade include Russian National Research Medical University & Moscow State Institute of Radio Engineering, Electronics and Automation.
Papers
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Physical principles of plasma antenna operation
TL;DR: In this article, basic principles of operation of plasma antennas based on volume and surface plasma waves are presented, and it is demonstrated that the efficiency of the plasma antennas does not yield to that of metal antennas and that the controllability and radar invisibility are significantly higher.
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Vortex rings and plasma toroidal vortices in homogeneous unbounded media. II. The study of vortex formation process
U. Yusupaliev,N. P. Savenkova,Yu. V. Troshchiev,S. A. Shuteev,S. A. Skladchikov,E. E. Vinke,N. G. Gusein-zade +6 more
TL;DR: In this article, the conditions of the formation of toroidal vortices (TVs) at atmospheric pressure were determined, and the results of the preliminary numerical calculation were in agreement with experimental data.
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Plasma Masers: Status Quo and Development Prospects
TL;DR: In this paper, the research status and prospects for development of plasma relativistic microwave electronics as a basis for plasma masers are considered and possible applications are determined for plasmas as high-power sources of microwave pulses.
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Analytical Derivation of the Stefan–Boltzmann Law for Integral Radiance from Planck’s Law for Spectral Radiance
TL;DR: In this article, the Stefan Boltzmann law for integral radiation flux was derived based on the Planck's law for the spectral radiation flux of an object, which is a special case of the spectrum radiation flux.
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Phase transition in a harmonic oscillator with dynamical traps
TL;DR: In this paper, an individual oscillator with dynamical traps located in a small neighborhood of the x axis of the phase plane is analyzed numerically, and it is shown that the dynamics of such an oscillator can be represented by a number of random jump-like transitions between long-lived states.