摘要

In this study, sub-combination internal resonance of a uniform cantilever beam of varying orientation with a tip mass under vertical base excitation was investigated. The Euler Bernoulli theory for the slender beam was used to derive the governing non-linear partial differential equation. The governing equation, which retains the cubic non-linearities of geometric and inertial type, was discretised using Galerkin's method. The resulting second-order temporal differential equation was then reduced by the method of multiple scales to a set of first order six non-linear ordinary-differential equations, governing the amplitudes and phases of the three interacting modes. Both frequency response and force response curves were plotted for the case Omega approximate to omega(4) = 1/2(omega(2)+omega(5)). Two possible responses occurred: single-mode and three-mode responses. The single-mode periodic response was observed to undergo supercritical and subcritical pitchfork bifurcations, which caused three-mode interactions. In the event of three-mode responses, there are conditions for which the low-frequency mode becomes effective over the response, resulting in high-amplitude oscillations.

  • 出版日期2014-1