Stability of two-degrees-of-freedom aero-elastic models with frequency and time variable parametric self-induced forces

0447164 - ÚTAM 2016 RIV GB eng J - Journal Article
Náprstek, Jiří - Pospíšil, Stanislav - Yau, J. D.
Stability of two-degrees-of-freedom aero-elastic models with frequency and time variable parametric self-induced forces.
Journal of Fluids and Structures. Roč. 57, August (2015), s. 91-107. ISSN 0889-9746. E-ISSN 1095-8622
R&D Projects: GA MŠMT(CZ) LO1219; GA ČR(CZ) GC13-34405J
Institutional support: RVO:68378297
Keywords : aero-elastic system * self-excited vibration * dynamic stability * Routh–Hurwitz conditions * flutter derivatives * divergence
Subject RIV: JM - Building Engineering
Impact factor: 1.709, year: 2015
http://dx.doi.org/10.1016/j.jfluidstructs.2015.05.010

The lowest critical state of slender systems representing long suspension bridges can be investigated using two degree of freedom linear models.Initially,the neutral model with aero-elastic forces treated as constants can be used and such approach works well on the theoretical level.However,because time dependency is neglected,it is naturally limited to the very close neighborhood of the bifurcation point.Thus,an approach using aero- elastic coefficients known as flutter derivatives was introduced in the past.The present paper combines these models together on one common basis and establishes linkage to avoid the time–frequency duality.The stability limits are analysed by means of the generalized Routh–Hurwitz approach and Liénard theorems. Some examples of bridge stability analyses are provided using experimentally ascertained or literature based data.
Permanent Link: http://hdl.handle.net/11104/0249090