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The stability of limit-cycle oscillations in a nonlinear aeroelastic system

Publication ,  Journal Article
Trickley, ST; Virgin, LN; Dowell, EH
Published in: Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences
September 8, 2002

The effects of a freeplay structural nonlinearity on an aeroelastic system are studied experimentally. Particular attention is paid to the stability of a periodic nonlinear aeroelastic response, known as limit-cycle oscillations (LCOs). The major thrust of this research lies in the application of relatively recently developed techniques from nonlinear dynamics and signal processing to the realm of experimental aeroelasticity. Innovations from the field of nonlinear dynamics include time-delay embedded coordinates to reconstruct system dynamics, a Poincaré section to assess the periodic nature of a response and to prescribe an operating point about which a linear description of the dynamics can be approximated, stochastic perturbations to assess the stability and robustness of responses, and a basin of attraction measure to assess initial condition dependence. A novel system-identification approach is used to generate a linear approximation of the experimental system dynamics about the LCO. This technique makes use of a rotating slotted cylinder gust generator and incorporates a least-squares fit of the resulting transient dynamics. An extension to this method is then developed based on the outcome of relatively large disturbances to the flow and hence airfoil, to obtain global stability.

Duke Scholars

Published In

Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences

DOI

ISSN

1364-5021

Publication Date

September 8, 2002

Volume

458

Issue

2025

Start / End Page

2203 / 2226

Related Subject Headings

  • 51 Physical sciences
  • 49 Mathematical sciences
  • 40 Engineering
  • 09 Engineering
  • 02 Physical Sciences
  • 01 Mathematical Sciences
 

Citation

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Trickley, S. T., Virgin, L. N., & Dowell, E. H. (2002). The stability of limit-cycle oscillations in a nonlinear aeroelastic system. Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, 458(2025), 2203–2226. https://doi.org/10.1098/rspa.2002.0965
Trickley, S. T., L. N. Virgin, and E. H. Dowell. “The stability of limit-cycle oscillations in a nonlinear aeroelastic system.” Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences 458, no. 2025 (September 8, 2002): 2203–26. https://doi.org/10.1098/rspa.2002.0965.
Trickley ST, Virgin LN, Dowell EH. The stability of limit-cycle oscillations in a nonlinear aeroelastic system. Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences. 2002 Sep 8;458(2025):2203–26.
Trickley, S. T., et al. “The stability of limit-cycle oscillations in a nonlinear aeroelastic system.” Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences, vol. 458, no. 2025, Sept. 2002, pp. 2203–26. Scopus, doi:10.1098/rspa.2002.0965.
Trickley ST, Virgin LN, Dowell EH. The stability of limit-cycle oscillations in a nonlinear aeroelastic system. Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences. 2002 Sep 8;458(2025):2203–2226.
Journal cover image

Published In

Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences

DOI

ISSN

1364-5021

Publication Date

September 8, 2002

Volume

458

Issue

2025

Start / End Page

2203 / 2226

Related Subject Headings

  • 51 Physical sciences
  • 49 Mathematical sciences
  • 40 Engineering
  • 09 Engineering
  • 02 Physical Sciences
  • 01 Mathematical Sciences