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On the approximation of the limit cycles function
"... We consider planar vector fields depending on a real parameter. It is assumed that this vector field has a family of limit cycles which can be described by means of the limit cycles function l. We prove a relationship between the multiplicity of a limit cycle of this family and the order of a zero o ..."
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We consider planar vector fields depending on a real parameter. It is assumed that this vector field has a family of limit cycles which can be described by means of the limit cycles function l. We prove a relationship between the multiplicity of a limit cycle of this family and the order of a zero
Limit cycle bifurcations . . .
, 2009
"... In this paper we complete the global qualitative analysis of a quartic ecological model. In particular, studying global bifurcations of singular points and limit cycles, we prove that the corresponding dynamical system has at most two limit cycles. ..."
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In this paper we complete the global qualitative analysis of a quartic ecological model. In particular, studying global bifurcations of singular points and limit cycles, we prove that the corresponding dynamical system has at most two limit cycles.
Credit Cycles
 Journal of Political Economy
, 1997
"... We construct a model of a dynamic economy in which lenders cannot force borrowers to repay their debts unless the debts are secured. In such an economy, durable assets play a dual role: not only are they factors of production, but they also serve as collateral for loans. The dynamic interaction betw ..."
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Cited by 1673 (38 self)
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between credit limits and asset prices turns out to be a powerful transmission mechanism by which the effects of shocks persist, amplify, and spill over to other sectors. We show that small, temporary shocks to technology or income distribution can generate large, persistent fluctuations in output
On the number of limit cycles of the
, 1997
"... In this paper, we study a Liénard system of the form ˙x = y−F(x) , ˙y = −x, where F(x) is an odd polynomial. We introduce a method that gives a sequence of algebraic approximations to the equation of each limit cycle of the system. This sequence seems to converge to the exact equation of each limit ..."
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In this paper, we study a Liénard system of the form ˙x = y−F(x) , ˙y = −x, where F(x) is an odd polynomial. We introduce a method that gives a sequence of algebraic approximations to the equation of each limit cycle of the system. This sequence seems to converge to the exact equation of each limit
1.1 Limit Cycles
"... In thefirstexperiment of this laboratory, weexamine a sourcecode exampleof acascaded biquad IIR filter implemented in fixedpoint arithmetic. The second task deals with zeroinput limit cycles in fixedpoint IIR filters. ..."
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In thefirstexperiment of this laboratory, weexamine a sourcecode exampleof acascaded biquad IIR filter implemented in fixedpoint arithmetic. The second task deals with zeroinput limit cycles in fixedpoint IIR filters.
BIFURCATIONS AND LIMIT CYCLES IN THE
"... KEY WORDS limit cycles; bifurcations; noise; chaos; stochastic resonance; neural coding; variability ABSTRACT Based on insight obtained from a newly developed cochlea model, we argue that noisedriven limit cycles are the basic ingredient in the mammalian cochlea hearing process. For insect auditio ..."
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KEY WORDS limit cycles; bifurcations; noise; chaos; stochastic resonance; neural coding; variability ABSTRACT Based on insight obtained from a newly developed cochlea model, we argue that noisedriven limit cycles are the basic ingredient in the mammalian cochlea hearing process. For insect
Analysis and Control of Limit Cycle
"... Abstract. The chapter addresses bifurcations of limit cycles for a general class of nonlinear control systems depending on parameters. A set of simple approximate analytical conditions characterizing all generic limit cycle bifurcations is determined via a first order harmonic balance analysis in a ..."
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Abstract. The chapter addresses bifurcations of limit cycles for a general class of nonlinear control systems depending on parameters. A set of simple approximate analytical conditions characterizing all generic limit cycle bifurcations is determined via a first order harmonic balance analysis
Excitatory and inhibitory interactions in localized populations of model
 Biophysics
, 1972
"... ABSMAcr Coupled nonlinear differential equations are derived for the dynamics of spatially localized populations containing both excitatory and inhibitory model neurons. Phase plane methods and numerical solutions are then used to investigate population responses to various types of stimuli. The res ..."
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Cited by 495 (11 self)
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. The results obtained show simple and multiple hysteresis phenomena and limit cycle activity. The latter is particularly interesting since the frequency ofthe limit cycle oscillationis found to be a monotonic function of stimulus intensity. Finally, it is proved that the existence of limit cycle dynamics
Limit cycles in two types of . . .
, 2007
"... Liénard systems and their generalized forms are classical and important models of nonlinear oscillators, and have been widely studied by mathematicians and scientists. The main problem considered is the maximal number of limit cycles that the system can have. In this paper, two types of symmetric po ..."
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Liénard systems and their generalized forms are classical and important models of nonlinear oscillators, and have been widely studied by mathematicians and scientists. The main problem considered is the maximal number of limit cycles that the system can have. In this paper, two types of symmetric
Results 1  10
of
12,513