Add to ORKGAn application of the new method of complete bifurcation groups (MCBG) in a parametrically excited pendulum system with additional linear restoring moment and with the periodically vibrating point of suspension in both directions is introduced. Construction of complete bifurcation groups is based on the method of stable and unstable periodic regimes continuation on a parameter. Global bifurcation analysis of the parametric pendulum system allows to find new bifurcation groups, rare attractors and chaotic regimes
The pendulum systems are widely used in the engineering, but their qualitative behavior hasn’t been ...
This paper devoted to application of the new method of complete bifurcation groups (MCBG), which sho...
The article is devoted to the parametrical analysis of periodic and chaotic oscillations in the nonl...
An application of the new method of complete bifurcation groups (MCBG) in a parametrically excited p...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
The complete bifurcation analysis of the driven damped pendulum systems by the new method of complet...
Dynamically stable periodic solutions of a pendulum with the periodically vibrating point of suspens...
The paper reports the complete bifurcation analysis of the driven damped pendulum systems by the new...
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...
A new approach for the global bifurcation analysis for strongly nonlinear dynamical systems, based o...
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...
This paper devoted to application of the new method of complete bifurcation groups (MCBG), which sho...
The pendulum systems are widely used in the engineering, but their qualitative behavior hasn’t been ...
This paper devoted to application of the new method of complete bifurcation groups (MCBG), which sho...
The article is devoted to the parametrical analysis of periodic and chaotic oscillations in the nonl...
An application of the new method of complete bifurcation groups (MCBG) in a parametrically excited p...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
The complete bifurcation analysis of the driven damped pendulum systems by the new method of complet...
Dynamically stable periodic solutions of a pendulum with the periodically vibrating point of suspens...
The paper reports the complete bifurcation analysis of the driven damped pendulum systems by the new...
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...
A new approach for the global bifurcation analysis for strongly nonlinear dynamical systems, based o...
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...
This paper devoted to application of the new method of complete bifurcation groups (MCBG), which sho...
The pendulum systems are widely used in the engineering, but their qualitative behavior hasn’t been ...
This paper devoted to application of the new method of complete bifurcation groups (MCBG), which sho...
The article is devoted to the parametrical analysis of periodic and chaotic oscillations in the nonl...