Quasi-harmonic self-oscillations in discrete time: analysis and synthesis of dynamic systems
Автор: Zaitsev Valery V., Karlov Alexander V.
Журнал: Физика волновых процессов и радиотехнические системы @journal-pwp
Статья в выпуске: 4 т.24, 2021 года.
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For sampling of time in a differential equation of movement of Thomson type oscillator (generator) it is offered to use a combination of the numerical method of finite differences and an asymptotic method of the slowl-changing amplitudes. The difference approximations of temporal derivatives are selected so that, first, to save conservatism and natural frequency of the linear circuit of self-oscillatory system in the discrete time. Secondly, coincidence of the difference shortened equation for the complex amplitude of self-oscillations in the discrete time with Euler’s approximation of the shortened equation for amplitude of self-oscillations in analog system prototype is required. It is shown that realization of such approach allows to create discrete mapping of the van der Pol oscillator and a number of mappings of Thomson type oscillators. The adequacy of discrete models to analog prototypes is confirmed with also numerical experiment.
Self-oscillatory system, motion equation, the discrete time, finite differences, slowly changing amplitudes, the shortened equations, the discrete mapping of thomson self-oscillators
Короткий адрес: https://sciup.org/140290771
IDR: 140290771 | DOI: 10.18469/1810-3189.2021.24.4.19-24