Analytical, numerical and experimental observation of isolated branches of periodic orbits in 1DOF mechanical parametric oscillator.

The aim of this study is to investigate the dynamic properties of an existing experimental stand of 1DOF mechanical parametric oscillator, with a focus on approximate analytical solutions of the observed isolated branches of periodic orbits. The experimental stand involves a cart moving along a rolling guide, with the stiffness consisting of two components: a time-varying linear element created by a rotating rod with a rectangular cross-section and a nonlinear hardening stiffness caused by magnetic springs. It was demonstrated that a rolling bearing's nonlinear resistance to motion consists of viscous damping and a second component analytically compared to dry friction. The study utilises multiple scales and harmonic balancing methods to provide analytical solutions. It is then successfully validated using numerical simulations and experimental data. The study investigates how dry friction influences oscillator response and applies the modified Mathieu–Duffing equation to represent the system's dynamics. Different branches of periodic orbits are researched to determine their function in energy harvesting and mechanical system improvement. This research demonstrates the distinctions across analytical, numerical, and experimental methodologies, providing a comprehensive understanding of investigating intricate nonlinear systems. • Analytical derivation of the periodic solutions of 1DOF mechanical parametric oscillator with dry friction. • The existence of isolated branches of periodic orbits has been observed. • Very good qualitative agreement was achieved between analytical, numerical and experimental solutions. • Numerically computed basins of attraction allows for a better understanding of the investigated system dynamics. [ABSTRACT FROM AUTHOR]