On the periodic response of a harmonically excited dry friction oscillator

The method of equivalent linearization has been extended to obtain periodic responses of harmonically excited, piecewise non-linear oscillators. A dual representation of the solution is used to enhance greatly the algebraic simplicity. The stability analysis of the solutions so obtained is carried o

A single-degree-of-freedom damped oscillator excited by dry friction forces of unknown exact characteristics is considered. Asymptotic behaviour of the oscillator has been studied by using the method of optimal Lyapunov functions. Optimal estimates of the limit region have been obtained for various

The self-excited oscillations of an oscillator which is coupled by dry friction to a base moving at a constant velocity (Fig. 1) is considered. It is assumed that the coefficient of sliding frictionff is constant and that the coefficient of static friction is a pie, cew~linear function of the durati

A system of two masses, moving along a single straight line, is considered. The first is connected by a spring to a fixed point, while the second is connected by a spring to the first and is in contact with a belt with dry friction moving with constant velocity. A piecewise-constant model of dry fri

A single-degree-of-freedom system with the parallel presence of a linear spring, a viscous damper and a contact dry friction device is studied here. The mass may slide or stick on the belt when the driver moves periodically or at a constant speed. We derive closed-form solutions according to a more