Add to ORKGA mathematical model describing the capture of nonlinear systems into the autoresonance by a combined parametric and external periodic slowly varying perturbation is considered. The autoresonance phenomenon is associated with solutions having an unboundedly growing amplitude and a limited phase mismatch. The paper investigates the behaviour of such solutions when the parameters of the excitation pass through bifurcation values. In particular, the stability of different autoresonant modes is analyzed and the asymptotic approximations of autoresonant solutions on asymptotically long time intervals are proposed by a modified averaging method with using the constructed Lyapunov functions.Comment: 23 pages, 17 figure
his paper addresses the amplitude and phase dynamics of a large system of nonlinearly coupled, non-i...
PublishedThis paper studies the synchronization in two mechanical oscillators coupled by impacts whi...
Nonlinear systems are known to exhibit widely differing steady-state behaviors based on small modifi...
We consider a system of two nonlinear differential equations describing the capture into autoresonan...
We consider a system of two nonlinear differential equations describing the capture into autoresonan...
Various types of self-excited oscillators are implemented into an autoparametric system, and the stu...
We consider an autoparametric system which consists of an oscillator coupled with a parametricallyex...
We consider an autoparametric system which consists of an oscillator coupled with a parametricallyex...
AbstractThis paper investigates the emergence of autoresonance (AR) with growing energy in a chain o...
BVP oscillator is the simplest mathematical model describing dynamical behavior of the neural activi...
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast os...
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast os...
AbstractThe effects of periodic parametric perturbations on a system undergoing Hopf bifurcation are...
This paper studies the synchronization in two mechanical oscillators coupled by impacts which can be...
In this Thesis we study the dynamics of systems of two and three coupled oscillators by efficiently...
his paper addresses the amplitude and phase dynamics of a large system of nonlinearly coupled, non-i...
PublishedThis paper studies the synchronization in two mechanical oscillators coupled by impacts whi...
Nonlinear systems are known to exhibit widely differing steady-state behaviors based on small modifi...
We consider a system of two nonlinear differential equations describing the capture into autoresonan...
We consider a system of two nonlinear differential equations describing the capture into autoresonan...
Various types of self-excited oscillators are implemented into an autoparametric system, and the stu...
We consider an autoparametric system which consists of an oscillator coupled with a parametricallyex...
We consider an autoparametric system which consists of an oscillator coupled with a parametricallyex...
AbstractThis paper investigates the emergence of autoresonance (AR) with growing energy in a chain o...
BVP oscillator is the simplest mathematical model describing dynamical behavior of the neural activi...
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast os...
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast os...
AbstractThe effects of periodic parametric perturbations on a system undergoing Hopf bifurcation are...
This paper studies the synchronization in two mechanical oscillators coupled by impacts which can be...
In this Thesis we study the dynamics of systems of two and three coupled oscillators by efficiently...
his paper addresses the amplitude and phase dynamics of a large system of nonlinearly coupled, non-i...
PublishedThis paper studies the synchronization in two mechanical oscillators coupled by impacts whi...
Nonlinear systems are known to exhibit widely differing steady-state behaviors based on small modifi...