Coexisting solutions and bifurcations in mechanical oscillators with backlash
Coexisting solutions and bifurcations in mechanical oscillators with backlash
Lightly damped backlash systems have been shown to exhibit unwanted noise and vibration problems and we present a nonlinear analysis of this behaviour. As a representative example, we derive a simple model for a pair of meshing spur gears as a single-degree-of-freedom oscillator with backlash. We consider the behaviour of such a system with low damping, and with both large finite and infinite stiffness values. We show that the permanent contact solution can coexist with many other stable rattling solutions which we compute analytically. We calculate the regions of existence and stability of the families of rattling solutions on two-parameter bifurcation diagrams, and show that to leading order the large finite and infinite stiffness models give the same results. We provide numerical simulation to support our analysis, and we also draw practical conclusions for machine design.
854-885
Halse, Christopher K.
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Wilson, R. Eddie
01d7f1f2-f8ee-4661-b713-dcefcddb89bd
di Bernardo, Mario
12dfde1b-bf9c-40f9-ac92-3e41c5454cd9
Homer, Martin E.
e71d28d1-c8df-4c08-a307-45e6efdd87ea
11 September 2007
Halse, Christopher K.
a6736b32-718d-4a72-b642-dff7a87cbfe3
Wilson, R. Eddie
01d7f1f2-f8ee-4661-b713-dcefcddb89bd
di Bernardo, Mario
12dfde1b-bf9c-40f9-ac92-3e41c5454cd9
Homer, Martin E.
e71d28d1-c8df-4c08-a307-45e6efdd87ea
Halse, Christopher K., Wilson, R. Eddie, di Bernardo, Mario and Homer, Martin E.
(2007)
Coexisting solutions and bifurcations in mechanical oscillators with backlash.
Journal of Sound and Vibration, 305 (4-5), .
(doi:10.1016/j.jsv.2007.05.010).
Abstract
Lightly damped backlash systems have been shown to exhibit unwanted noise and vibration problems and we present a nonlinear analysis of this behaviour. As a representative example, we derive a simple model for a pair of meshing spur gears as a single-degree-of-freedom oscillator with backlash. We consider the behaviour of such a system with low damping, and with both large finite and infinite stiffness values. We show that the permanent contact solution can coexist with many other stable rattling solutions which we compute analytically. We calculate the regions of existence and stability of the families of rattling solutions on two-parameter bifurcation diagrams, and show that to leading order the large finite and infinite stiffness models give the same results. We provide numerical simulation to support our analysis, and we also draw practical conclusions for machine design.
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Published date: 11 September 2007
Identifiers
Local EPrints ID: 184251
URI: http://eprints.soton.ac.uk/id/eprint/184251
ISSN: 0022-460X
PURE UUID: dd43a3fa-b614-4971-b47e-68a70d653fa3
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Date deposited: 12 May 2011 08:47
Last modified: 14 Mar 2024 03:07
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Contributors
Author:
Christopher K. Halse
Author:
R. Eddie Wilson
Author:
Mario di Bernardo
Author:
Martin E. Homer
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