The double pendulum, a simple system of classical mechanics, is widely studied as an example of, and testbed for, chaotic dynamics. In 2016, Maiti et al. studied a generalization of the simple double pendulum with equal point-masses at equal lengths, to a rotating double pendulum, fixed to a coordinate system uniformly rotating about the vertical. In this paper, we study a considerable generalization of the double pendulum, constructed from physical pendula, and ask what equilibrium configurations exist for the system across a comparatively large parameter space, as well as what bifurcations occur in those equilibria. Elimination algorithms are employed to reduce systems of polynomial equations, which allows for equilibria to be visualized,...
SIGLEAvailable from British Library Document Supply Centre- DSC:D93077 / BLDSC - British Library Doc...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
This work looks at the nonlinear dynamical motion of an unstretched two degrees of freedom double pe...
M.Sc. (Applied Mathematics)Abstract: Amongst the very interesting, exciting and beautiful topics in ...
Chaotic systems are strange. They are not periodic or convergent. One well-known chaotic system is t...
This paper investigates dynamics of double pendulum subjected to vertical parametric kinematic excit...
The fusion of two pendulums give rise to a simple mechanical system that on contrary to its deceptiv...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...
We study a version of the two-degree-of-freedom double pendulum in which the two point masses are re...
Laws of mechanicThis shows the time evolution of a frictionless two-pendulum system. It is one of th...
A transverse spinning double pendulum is introduced. This pendulum is of interest as a simple mechan...
This paper explores pattern evocation and the visualization of orbits of the double spherical pendul...
In dynamical systems governed by differential equations, a guarantee that trajectories emanating fro...
Melnikov’s method is applied to the planar double pendulum proving it to be a chaotic system. The pa...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
SIGLEAvailable from British Library Document Supply Centre- DSC:D93077 / BLDSC - British Library Doc...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
This work looks at the nonlinear dynamical motion of an unstretched two degrees of freedom double pe...
M.Sc. (Applied Mathematics)Abstract: Amongst the very interesting, exciting and beautiful topics in ...
Chaotic systems are strange. They are not periodic or convergent. One well-known chaotic system is t...
This paper investigates dynamics of double pendulum subjected to vertical parametric kinematic excit...
The fusion of two pendulums give rise to a simple mechanical system that on contrary to its deceptiv...
This thesis involves the analysis of four classes of nonlinear oscillators. We investigate a damped ...
We study a version of the two-degree-of-freedom double pendulum in which the two point masses are re...
Laws of mechanicThis shows the time evolution of a frictionless two-pendulum system. It is one of th...
A transverse spinning double pendulum is introduced. This pendulum is of interest as a simple mechan...
This paper explores pattern evocation and the visualization of orbits of the double spherical pendul...
In dynamical systems governed by differential equations, a guarantee that trajectories emanating fro...
Melnikov’s method is applied to the planar double pendulum proving it to be a chaotic system. The pa...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
SIGLEAvailable from British Library Document Supply Centre- DSC:D93077 / BLDSC - British Library Doc...
An application of the new method of complete bifurcation groups (MCBG) in parametrically excited pen...
This work looks at the nonlinear dynamical motion of an unstretched two degrees of freedom double pe...