Bifurcation theory deals with the dynamics associated to vector fields x ̇ = fx(x, λ) λ ̇ = 0 (1.1
In this paper, we observed the ordinary differential equation (ODE) system and determined the equili...
Tire de : AGARD Lecture Series No 191, Non Linear Dynamics and Chaos, Part 1 : pp. 3-1 to 3-10, Part...
New methods and approaches of the global bifurcation analysis of non-linear dynamical systems, descr...
The paper is devoted to the global bifurcation analysis of the models of strongly nonlinear forced o...
Bifurcations indicate qualitative changes in a system's behavior. For a dynamical system dy/dt=f(y,λ...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
Bifurcation theory and catastrophe theory are two of the best known areas within the field of dynami...
The work is devoted to the novel global analysis of the strongly nonlinear dynamical systems (NDS) b...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN029925 / BLDSC - British Library D...
A new approach for the global bifurcation analysis for strongly nonlinear dynamical systems, based o...
A new approach for the global bifurcation analysis for strongly nonlinear dynamical systems, based o...
International audienceBifurcation theory deals with the asymptotic (long time) behaviour of systems ...
Topological bifurcations of minimal invariant sets for set-valued dynamical systems b
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN004721 / BLDSC - British Library D...
Abstract. This paper will introduce the topic of dynamical systems with both discrete and continuous...
In this paper, we observed the ordinary differential equation (ODE) system and determined the equili...
Tire de : AGARD Lecture Series No 191, Non Linear Dynamics and Chaos, Part 1 : pp. 3-1 to 3-10, Part...
New methods and approaches of the global bifurcation analysis of non-linear dynamical systems, descr...
The paper is devoted to the global bifurcation analysis of the models of strongly nonlinear forced o...
Bifurcations indicate qualitative changes in a system's behavior. For a dynamical system dy/dt=f(y,λ...
The theory of dynamical systems studies the behavior of solutions of systems, like nonlinear ordinar...
Bifurcation theory and catastrophe theory are two of the best known areas within the field of dynami...
The work is devoted to the novel global analysis of the strongly nonlinear dynamical systems (NDS) b...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN029925 / BLDSC - British Library D...
A new approach for the global bifurcation analysis for strongly nonlinear dynamical systems, based o...
A new approach for the global bifurcation analysis for strongly nonlinear dynamical systems, based o...
International audienceBifurcation theory deals with the asymptotic (long time) behaviour of systems ...
Topological bifurcations of minimal invariant sets for set-valued dynamical systems b
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN004721 / BLDSC - British Library D...
Abstract. This paper will introduce the topic of dynamical systems with both discrete and continuous...
In this paper, we observed the ordinary differential equation (ODE) system and determined the equili...
Tire de : AGARD Lecture Series No 191, Non Linear Dynamics and Chaos, Part 1 : pp. 3-1 to 3-10, Part...
New methods and approaches of the global bifurcation analysis of non-linear dynamical systems, descr...
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