On the dynamic stability of an axially oscillating beam

Dynamic stability of an axially oscillating cantilever beam is investigated in this paper. Equations of motion for the axially oscillating beam are derived and transformed into dimensionless forms. The equations include harmonically oscillating parameters which are related to the motion-induced sti!

This paper determines approximate stability~inetability reoion boundaries for two eases of parametric excitation. The first problem considers periodicj axial, tension variation of slender, a.vially moving materials such as band saws, belts, tapes, strings and chains; the second case investigates ins

The linear dynamic behaviour of a uniform beam with its cross-section having at least two symmetry axes (the shear centre is coincident with the centroid), rotating with constant velocity about its longitudinal axis and carrying an axial dead load is analyzed. Internal damping is also considered by

The equations of motion of a pre-twisted cantilever beam with a spinning base subject to axial base excitations are formulated by using Euler beam theory and the assumed mode method. The effects of sinusoidal perturbations in terms of the axial accelerations of the beam are then examined by using Bo