A generalized approach to the study of self-oscillators
Abstract
The operator equation of a self-oscillator x(t) = Ax(t), when Ax(t) is represented in the form of a convergent Volterra-Wiener series with separable kernels, is reduced to a homogeneous nonlinear Volterra integral equation of the second kind. The functional model of an oscillator, built on the basis of this equation, contains a series closed connection of linear and lag-free nonlinear elements. The properties, which the elements of the model must possess for periodic or nearly periodic oscillations to exist in the system are considered.
- Publication:
-
Radiotekhnika i Elektronika
- Pub Date:
- August 1974
- Bibcode:
- 1974RaEl...19.1690K
- Keywords:
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- Nonlinear Systems;
- Oscillators;
- Self Oscillation;
- Volterra Equations;
- Electronic Equipment;
- Kernel Functions;
- Linear Filters;
- Wiener Filtering;
- Electronics and Electrical Engineering