Please use this identifier to cite or link to this item: http://dx.doi.org/10.18419/opus-8042
|Title:||Local and global stability of a piecewise linear oscillator|
|metadata.ubs.publikation.source:||Philosophical transactions / The Royal Society, A 338 (1992), S. 533-546. URL http://www.jstor.org/stable/54026|
|Abstract:||Machines and mechanisms with moving parts, subjected to periodic excitation, often show unexpected dynamic behaviour, and impacts due to their connection clearances may occur. The most simple mathematical model is a one degree-of-freedom nonlinear oscillator governed by a piecewise linear symmetric function to describe the restoring force. The systems response, which can be quite rich and complicated, is described in detail. Modern methods for a combined analytical and numerical analysis are used to study local and global bifurcation conditions, coexisting solutions and their associated domains of attraction.|
|Appears in Collections:||15 Fakultätsübergreifend / Sonstige Einrichtung|
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