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
Despite its importance for applications, relatively little progress has been made towards the develo...
Dynamical systems modelling physical processes often evolve on several time- scales with different ...
In a previous paper we introduced various definitions of stability and instability for non-autonomo...
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast os...
We consider a 2-dimensional ordinary differential equation (ODE) depending on a parameter e. If the ...
We consider the Cauchy-problem for the parabolic equation $$ u_t = Delta u+ f(u,|x|), $$ where $...
We consider a $2$-dimensional ordinary differential equation (ODE) depending on a parameter $\epsilo...
A mathematical model describing the capture of nonlinear systems into the autoresonance by a combine...
The Hopf bifurcation in slow-fast systems with two slow variables and one fast variable has been stu...
Dynamical Bifurcation Theory is concerned with the phenomena that occur in one parameter families of...
AbstractAlthough, bifurcation theory of ordinary differential equations with autonomous and periodic...
We analyze the characteristics of the global attractor of a type of dissipative nonautonomous dynam...
A few mathematical problems arising in the classical synchronization theory are discussed, especiall...
<br/> <br/>Dynamical systems modelling physical processes often evolve on several time- ...
AbstractTo discover qualitative changes of solutions of differential equations, one has to study the...
Despite its importance for applications, relatively little progress has been made towards the develo...
Dynamical systems modelling physical processes often evolve on several time- scales with different ...
In a previous paper we introduced various definitions of stability and instability for non-autonomo...
We study some elementary bifurcation patterns when the bifurcation parameter is subjected to fast os...
We consider a 2-dimensional ordinary differential equation (ODE) depending on a parameter e. If the ...
We consider the Cauchy-problem for the parabolic equation $$ u_t = Delta u+ f(u,|x|), $$ where $...
We consider a $2$-dimensional ordinary differential equation (ODE) depending on a parameter $\epsilo...
A mathematical model describing the capture of nonlinear systems into the autoresonance by a combine...
The Hopf bifurcation in slow-fast systems with two slow variables and one fast variable has been stu...
Dynamical Bifurcation Theory is concerned with the phenomena that occur in one parameter families of...
AbstractAlthough, bifurcation theory of ordinary differential equations with autonomous and periodic...
We analyze the characteristics of the global attractor of a type of dissipative nonautonomous dynam...
A few mathematical problems arising in the classical synchronization theory are discussed, especiall...
<br/> <br/>Dynamical systems modelling physical processes often evolve on several time- ...
AbstractTo discover qualitative changes of solutions of differential equations, one has to study the...
Despite its importance for applications, relatively little progress has been made towards the develo...
Dynamical systems modelling physical processes often evolve on several time- scales with different ...
In a previous paper we introduced various definitions of stability and instability for non-autonomo...
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