Abstract
The local dynamics of a well-known model of an optoelectronic oscillator with delayed feedback is studied. In a neighborhood of zero equilibrium, normalized equations are constructed which are boundary value problems depending on a continual parameter. Asymptotic solutions of the original nonlinear system in the form of a combination of slow and fast oscillations are obtained by solving the boundary value problems. The frequencies and amplitudes of the components of these solutions are determined.
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