Bifurcation of the roots of the characteristic polynomial and the destabilization paradox in friction induced oscillations

Abstract

Read online

Paradoxical effect of small dissipative and gyroscopic forces on the stability of a linear non-conservative system, which manifests itself through the unpredictable at first sight behavior of the critical non-conservative load, is studied. By means of the analysis of bifurcation of multiple roots of the characteristic polynomial of the non-conservative system, the analytical description of this phenomenon is obtained. As mechanical examples two systems possessing friction induced oscillations are considered: a mass sliding over a conveyor belt and a model of a disc brake describing the onset of squeal during the braking of a vehicle.

Keywords

• friction-induced oscillations
• circulatory system
• destabilization paradox due to small damping
• characteristic polynomial
• multiple roots
• bifurcation
• stability domain
• Whitney umbrella singularity