Wave propagation in a split Timoshenko beam

A mathematical model is presented for the propagation of structural waves on an in"nitely long, periodically supported Timoshenko beam. The wave types that can exist on the beam are bending waves with displacements in the horizontal and vertical directions, compressional waves and torsional waves. T

Broadband active control of flexural (bending) waves propagating along a beam is investigated theoretically and experimentally. In particular, a simple practical arrangement is studied in which the output of a single detection sensor (an accelerometer) is used to drive a single secondary force via a

A method is presented for studying propagating waves and end modes in a uniformly pretwisted beam. The variationally derived equations of motion are based on three-dimensional elasticity and finite element modelling of the cross-section. This discretization procedure accommodates arbitrarily shaped