Bifurcation and chaos in a system with a variable structure

The nonlinear dynamics of a cantilever system excited by a periodic force and taking into account the combined effects of impacts and nonlinear term due to the beam deflection is studied. Precise approximations of the beam deflection and consequently the overall stiffness are introduced to formulate

A detailed analysis is undertaken to explore the stability and bifurcation pattern of the nonlinear Bloch equation known to govern the dynamics of an ensemble of spins, controlling the basic process of nuclear magnetic resonance. After the initial analysis of the parameter space and stability region

For the power systems, the stabilization and tracking of voltage collapse trajectory, which involves severe nonlinear and nonstationary (unstable) features, is somewhat difficult to achieve. In this paper, we choose a widely used three-bus power system to be our case study. The study shows that the

Non-linear vibration characteristics of a rub-impact Jeffcott rotor are investigated. The system is two-dimensional, non-linear and periodic. Fourier series analysis and the Floquet theory are used to perform qualitative global analysis on bifurcation and stability. The governing ordinary differenti