STABILITY OF A TRANSLATING BEAM WITH FIXED AND MOVING VISCOUS DAMPING

The vibration and stability characteristics of a cracked beam translating between "xed supports are investigated. Using Hamilton's principle and elementary fracture mechanics, the equations of motion for the beam are developed. Throughout this analysis it is assumed that the crack is shallow and alw

The stability analysis for periodic motions of a class of harmonically excited single degree of freedom oscillators with piecewise linear characteristics is presented. The common characteristic of these oscillators is that they possess viscous and constant damping properties, which depend on their v

In this paper, the motion of a Bernoulli}Euler cantilever beam clamped on a moving cart and carrying an intermediate lumped mass is considered. The equations of motion of the beam}mass}cart system are analyzed through unconstrained modal analysis, and a uni"ed characteristic equation for calculating

## Abstract We consider a stabilization problem for a model arising in the control of noise. We prove that in the case where the control zone does not satisfy the geometric control condition, B.L.R. (see Bardos __et al. SIAM J. Control Optim.__ 1992; **30**:1024–1065), we have a polynomial stabilit

We consider a compressible viscous uid with the velocity at inÿnity equal to a strictly non-zero constant vector in R 3 . Under the assumptions on the smallness of the external force and velocity at inÿnity, Novotny-Padula (Math. Ann. 1997; 308:439-489) proved the existence and uniqueness of steady