2018
DOI: 10.20537/nd180302
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Features of Bifurcations of Periodic Solutions of the Ikeda Equation

Abstract: We study equilibrium states and bifurcations of periodic solutions from the equilibrium state of the Ikeda delay-differential equation well known in nonlinear optics. This equation was proposed as a mathematical model of a passive optical resonator in a nonlinear environment. The equation, written in a characteristic time scale, contains a small parameter at the derivative, which makes it singular. It is shown that the behavior of solutions of the equation with initial conditions from the fixed neighborhood of… Show more

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Cited by 6 publications
(17 citation statements)
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“…This work complements Ref. [2] and allows one to create a fairly complete picture of possible bifurcations of periodic solutions from equilibrium states of Eq. (1.1) and of the development of these solutions when changing the parameters of the equation to chaotic attractors, and to understand the structure of the phase space of the equation.…”
Section: Introductionmentioning
confidence: 73%
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“…This work complements Ref. [2] and allows one to create a fairly complete picture of possible bifurcations of periodic solutions from equilibrium states of Eq. (1.1) and of the development of these solutions when changing the parameters of the equation to chaotic attractors, and to understand the structure of the phase space of the equation.…”
Section: Introductionmentioning
confidence: 73%
“…The first is the case of the loss of stability of the zero equilibrium state when c = 0 at the point μ = 1, the second is the case of formation of a pair of equilibrium equations -a simultaneous formation of stable and unstable equilibrium states "out of thin air". These two cases share a single mechanism of loss of stability, different from that considered in [2]. In both cases, the possibility of bifurcation of a large number of periodic solutions and their development into chaotic multistability will be shown.…”
Section: Introductionmentioning
confidence: 86%
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“…Для построения центрального многообразия и системы дифференциальных уравнений на нем воспользуемся подходом работы [13]…”
Section: бифуркация пространственно-неоднородных решений начально-краunclassified