A simple approach to dynamic stabilization of a rotating body-beam

The dynamic stability of a cantilever beam attached to a translational/ rotational base is studied in this paper. Equations of motion for the simple ¯exure cantilever beam with a tip mass are derived by Hamilton's principle, and then transformed into a set of ordinary dierential equations by applyin

The equations of motion of a rotating cantilever beam subjected to base excitation are derived using the Euler beam theory and the assumed mode method. The coefficients of the resulting equations of motion are found to have two distinct and independent frequencies. One of them is the base excitatio

The ettects of rotational speed and root flexibilities on the static buckling loads and on the regions of dynamic instability of a Timoshenko beam are investigated by finite element method. Due to the action of rotation, the buckling loads are increased and the beam becomes less sensitive to periodi