Motion complexity in a non-classically damped system with closely spaced modes: From standing to traveling waves

Abstract: This article addresses the phenomenon of motion complexity in a periodically oscillating system, i.e. the occurrence of non-trivial phase lags among the system's coordinates. Specifically, the steady-state forced response of a linear, weakly damped, self-adjoint system is studied, for which the extent of motion complexity is typically expected to be small. Yet, it is shown that under the condition of closely spaced modes, weak non-classical damping may lead to a transition from standing waves to traveling wave… Show more

“…Recent investigations by the authors suggest that the same is true for the socalled motion complexity, i. e., the phase difference between the coordinates of the nonlinearly interacting modes [17,18].…”

On the Efficacy of Friction Damping in the Presence of Nonlinear Modal Interactions

“…Recent investigations by the authors suggest that the same is true for the socalled motion complexity, i. e., the phase difference between the coordinates of the nonlinearly interacting modes [17,18].…”

On the Efficacy of Friction Damping in the Presence of Nonlinear Modal Interactions

A comparative analysis of modal motions for the gyroscopic and non-gyroscopic two degree-of-freedom conservative systems