Publication date
January 2017
DOI Publisher
EUT Edizioni Università di Trieste Journal
0049-4704Abstract
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast oscillations
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast oscillations
The theory of nonautonomous dynamical systems in both of its formulations as processes and skew prod...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
In a previous paper we introduced various definitions of stability and instability for non-autonomou...
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast os...
AbstractAlthough, bifurcation theory of ordinary differential equations with autonomous and periodic...
Nonautonomous bifurcation patterns for one-dimensional differential equations. - In: Journal of diff...
Although the bifurcation theory of equations with autonomous and periodic time dependence is a major...
Towards a bifurcation theory for nonautonomous difference equations. - In: Journal of difference equ...
AbstractFor nonautonomous dynamical systems a bifurcation can be understood as topological change in...
There is a vast body of literature devoted to the study of bifurcation phenomena in autonomous syste...
We consider a $2$-dimensional ordinary differential equation (ODE) depending on a parameter $\epsilo...
In nonstationary (NS) systems some control parameters (CPs) have the following forms: CP(t) = CP0+ψ(...
The steady state and dynamic behavior of two-phase systems in physical equilibrium is investigated. ...
The study presented in this paper is one of a series of papers published by the authors on nonstatio...
For the first time analogues of nonautonomous transcritical and pitchfork bifurcations are investiga...
The theory of nonautonomous dynamical systems in both of its formulations as processes and skew prod...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
In a previous paper we introduced various definitions of stability and instability for non-autonomou...
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast os...
AbstractAlthough, bifurcation theory of ordinary differential equations with autonomous and periodic...
Nonautonomous bifurcation patterns for one-dimensional differential equations. - In: Journal of diff...
Although the bifurcation theory of equations with autonomous and periodic time dependence is a major...
Towards a bifurcation theory for nonautonomous difference equations. - In: Journal of difference equ...
AbstractFor nonautonomous dynamical systems a bifurcation can be understood as topological change in...
There is a vast body of literature devoted to the study of bifurcation phenomena in autonomous syste...
We consider a $2$-dimensional ordinary differential equation (ODE) depending on a parameter $\epsilo...
In nonstationary (NS) systems some control parameters (CPs) have the following forms: CP(t) = CP0+ψ(...
The steady state and dynamic behavior of two-phase systems in physical equilibrium is investigated. ...
The study presented in this paper is one of a series of papers published by the authors on nonstatio...
For the first time analogues of nonautonomous transcritical and pitchfork bifurcations are investiga...
The theory of nonautonomous dynamical systems in both of its formulations as processes and skew prod...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
In a previous paper we introduced various definitions of stability and instability for non-autonomou...
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