The stability of 3-DOF triple-rigid-body pendulum system near resonances

In this article, the motion of three degree-of-freedom (DOF) dynamical system consisting of a triple rigid body pendulum (TRBP) in the presence of three harmonically external moments is studied. In view of the generalized coordinates of the system, Lagrange's equations are used to obtain the governing system of equations of motion (EOM). The analytic approximate solutions are gained up to the third approximation utilizing the approach of multiple scales (AMS) as novel solutions. The solvability conditions are determined in accordance with the elimination of secular terms. Therefore, the arising various resonances cases have been categorized and the equations of modulation have been achieved. The temporal histories of the obtained approximate solutions, as well as the resonance curves, are visually displayed to reveal the positive effects of the various parameters on the dynamical motion. The numerical results of the governing system are achieved using the fourth-order Runge-Kutta method. The visually depicted comparison of asymptotic and numerical solutions demonstrates high accuracy of the employed perturbation approach. The criteria of Routh-Hurwitz are used to investigate the stability and instability zones, which are then analyzed in terms of steady-state solutions. The strength of this work stems from its uses in engineering vibrational control applications which carry the investigated system a huge amount of importance.

Automated summary

This article studies the motion of a three-degree-of-freedom dynamical system consisting of a triple rigid body pendulum under the influence of three harmonically external moments. The governing equations of motion are obtained using Lagrange's equations based on the generalized coordinates of the system. Approximate solutions up to the third approximation are obtained using the multiple scales approach, and the solvability conditions are determined by eliminating secular terms. The importance of this work lies in its applications in engineering vibrational control.