Random Eigenvalue Problems for Bending Vibrations of Beams

The objective of the present paper is to analyze coupled bending and torsional vibrations of distributed-parameter beams. The governing coupled set of partial differential equations is solved by separating the dynamic response in a quasistatic and in a complementary dynamic response. The quasistatic

A method is presented for using vibration measurements obtained at discrete locations on a randomly excited beam to estimate the power spectral density of bending strain. The technique is intended to be applied using a scanning laser vibrometer to allow a non-contacting measurement of random bending

A simpli"ed method of evaluating the fundamental frequency for the bending vibrations of cracked Euler}Bernouilli beams is presented. The method is based on the well-known approach of representing the crack in a beam through a hinge and an elastic spring, but here the transverse de#ection of the cra