In this paper, we observed the ordinary differential equation (ODE) system and determined the equilibrium points. To characterize them, we used the existing theory developed to visualize the behavior of the system. We describe the bifurcation that appears, which is characteristic of higher-dimensional systems, that is when a fixed point loses its stability without colliding with other points. Although it is difficult to determine the whole series of bifurcations that lead to chaos, we can say that it is a common opinion that it is precisely the Hopf bifurcation that leads to chaos when it comes to situations that occur in applications. Here, subcritical and supercritical bifurcation occurs, and we can say that subcritical bifurcation repres...
I Patterns typically arise at bifurcations I Some external forcing in the system changes and a patte...
Educação Superior::Ciências Exatas e da Terra::MatemáticaA first-order autonomous ordinary different...
In this paper, we study the effects of periodic perturbations on a smooth nonlinear system possessin...
The aim of the paper is to give an overview of bifurcation phenomena which are typical for non-smoot...
The aim of the paper is to give an overview of bifurcation phenomena which are typical for non-smoot...
A review is presented of the one-parameter, nonsmooth bifurcations that occur in a variety of contin...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
he mathematical theory of bifurcation originated in the semi-nal work of Henri Poincaré on systems o...
Abstract. This paper will introduce the topic of dynamical systems with both discrete and continuous...
Bifurcation theory and catastrophe theory are two of the best known areas within the field of dynami...
We consider a $2$-dimensional ordinary differential equation (ODE) depending on a parameter $\epsilo...
In modern natural sciences, the term of a dynamic system plays an important role and is a common typ...
This book systematically presents a fundamental theory for the local analysis of bifurcation and sta...
Bifurcations indicate qualitative changes in a system's behavior. For a dynamical system dy/dt=f(y,λ...
There is a vast body of literature devoted to the study of bifurcation phenomena in autonomous syste...
I Patterns typically arise at bifurcations I Some external forcing in the system changes and a patte...
Educação Superior::Ciências Exatas e da Terra::MatemáticaA first-order autonomous ordinary different...
In this paper, we study the effects of periodic perturbations on a smooth nonlinear system possessin...
The aim of the paper is to give an overview of bifurcation phenomena which are typical for non-smoot...
The aim of the paper is to give an overview of bifurcation phenomena which are typical for non-smoot...
A review is presented of the one-parameter, nonsmooth bifurcations that occur in a variety of contin...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
he mathematical theory of bifurcation originated in the semi-nal work of Henri Poincaré on systems o...
Abstract. This paper will introduce the topic of dynamical systems with both discrete and continuous...
Bifurcation theory and catastrophe theory are two of the best known areas within the field of dynami...
We consider a $2$-dimensional ordinary differential equation (ODE) depending on a parameter $\epsilo...
In modern natural sciences, the term of a dynamic system plays an important role and is a common typ...
This book systematically presents a fundamental theory for the local analysis of bifurcation and sta...
Bifurcations indicate qualitative changes in a system's behavior. For a dynamical system dy/dt=f(y,λ...
There is a vast body of literature devoted to the study of bifurcation phenomena in autonomous syste...
I Patterns typically arise at bifurcations I Some external forcing in the system changes and a patte...
Educação Superior::Ciências Exatas e da Terra::MatemáticaA first-order autonomous ordinary different...
In this paper, we study the effects of periodic perturbations on a smooth nonlinear system possessin...