Abstract
We develop and investigate a mathematical model of an aircraft nose landing gear with a dual-wheel configuration. The main aim here is to study the influence of a dual-wheel configuration on the existence of shimmy oscillations. To this end, we consider a model that describes the torsional and lateral vibrational modes and the non-linear interaction between them via the tyre-ground contact. More specifically, we perform a bifurcation analysis (with the software package auto) of the model in the two-parameter plane of forward velocity of the aircraft and vertical load on the nose landing gear. This two-parameter bifurcation diagram allows one to identify regions of different dynamics, and the question addressed here is how it depends on two key parameters of the dual-wheel configuration. Namely, we consider the influence of, first, the separation distance between the two wheels and, second, of gyroscopic effects arising from the inertia of the wheels. For both cases, we find that with increasing separation distance and wheel inertia, respectively, the lateral mode becomes more stable and the torsional mode becomes less stable. More specifically, we present associated bifurcation scenarios that explain the transitions between qualitatively different two-parameter bifurcation diagrams. Overall, we find that the separation distance and gyroscopic effects due to wheel inertia may have a significant influence on the quantitative and qualitative nature of shimmy oscillations in aircraft nose landing gears. In particular, the torsional and the lateral modes of a dual-wheel nose landing gear may interact in a quite complicated fashion.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Besselink, I.J.M.: Shimmy of aircraft main landing gears. PhD Dissertation, University of Delft, The Netherlands (2000)
Baumann, J.: A nonlinear model for landing gear shimmy with applications to the McDonnell Douglas G/A-18A. In: 81st Meeting of the AGARD Structures and Materials Panel. AGARD-R-800 (1995)
Glaser, J., Hrycko, G.: Landing gear shimmy—De Havilland’s experience. In: 81st Meeting of the AGARD Structures and Materials Panel. AGARD-R-800 (1995)
Krabacher, W.E.: A review of aircraft landing gear dynamics. In: 81st Meeting of the AGARD Structures and Materials Panel. AGARD-R-800 (1995)
Smiley, R.F.: Correlation, evaluation, and extension of linearized theories for tire motion and wheel shimmy. NACA-1299 (1957)
Broulhiet, M.G.: La suspension de la direction de la voiture automobile—shimmy et dandinement. Bull. Soc. Ing. Civ., France 78 (1925)
Dengler, M., Goland, M., Herrman, G.: A bibliographic survey of automobile and aircraft wheel shimmy. Technical report, Midwest Research Institute, Kansas city, MO, USA (1951)
Van Der Valk, R., Pacejka, H.B.: An analysis of a civil aircraft main gear shimmy failure. Veh. Syst. Dyn. 22, 97–121 (1993)
Pacejka, H.B.: Analysis of the shimmy phenomenon. Proc. IMECHE 180(2A)(10) (1965–1966)
Leve, H.L.: Designing stable dual wheel gears. In: AIAA Aircraft Design and Operations Meeting, Los Angeles, California (1969)
Pritchard, I.J.: An overview of landing gear dynamics. NASA/TM-1999-209143 (1999)
Thota, P., Krauskopf, B., Lowenberg, M.: Interaction of torsion and lateral bending in aircraft nose landing gear shimmy. Nonlinear Dyn. 57(3), 455–467 (2009)
von Schlippe, B., Dietrich, R.: Shimmying of a pneumatic wheel. Naca report 1365 (1947)
Doedel, E.J., Champneys, A.R., Fairgrieve, T., Kuznetsov, Yu., Sandstede, B., Wang, X.: Auto 97: continuation and bifurcation software for ordinary differential equations. http://indy.cs.concordia.ca/auto/ (May 2001)
Somieski, G.: Shimmy analysis of a simple aircraft nose landing gear model using different mathematical methods. Aerosp. Sci. Technol. 8, 545–555 (1997)
Guckenheimer, J., Holmes, P.: Nonlinear Oscillations, Dynamical Systems and Bifurcations of Vector Fields. Springer, New York (1983)
Kuznetsov, Yu.A.: Elements of Applied Bifurcation Theory. Springer, New York (1998)
Green, K., Krauskopf, B.: Bifurcation analysis of a semiconductor laser subject to non-instantaneous phase-conjugate feedback. Opt. Commun. 231(1–6), 383–393 (2004)
Erzgräber, H., Krauskopf, B., Lenstra, D.: Bifurcation analysis of a semiconductor laser with filtered optical feedback. SIAM J. Dyn. Control Syst. 6(1), 1–28 (2007)
Krauskopf, B., Walker, J.: Bifurcation study of a semiconductor laser with saturable absorber and delayed optical feedback. In: Lüdge, K. (ed.) Nonlinear Laser Dynamics. From Quantum Dots to Cryptography. Wiley-VCH, New York (2012) doi:10.1002/9783527639823
Green, K., Krauskopf, B.: Dynamics of patterns in lasers with delayed feedback. In: Dubbeldam, J., Green, K., Lenstra, D. (eds.) The Complexity of Dynamical Systems. A Multi-Disciplinary Perspective, pp. 37–62. Wiley-VCH, New York (2011)
Takacs, D., Stépán, G., Hogan, J.H.: Isolated large amplitude periodic motions of towed rigid wheels. Nonlinear Dyn. 52(1–2), 27–34 (2007)
Takacs, D., Stépán, G.: Experiments on quasi-periodic wheel shimmy. ASME J. Comput. Nonlinear Dyn. 4(3) (2009)
Sateesh, D., Maiti, D.: Non-linear analysis of a typical nose landing gear model with torsional free play. J. Aerospace Eng. 223(6), 627–641 (2009)
Sura, N., Suryanarayan, S.: Lateral response of nonlinear nose-wheel landing gear models with torsional free play. J. Aircraft 44(6) (2007)
Acknowledgements
We thank Airbus for their financial and technical support of this research.
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Thota, P., Krauskopf, B. & Lowenberg, M. Multi-parameter bifurcation study of shimmy oscillations in a dual-wheel aircraft nose landing gear. Nonlinear Dyn 70, 1675–1688 (2012). https://doi.org/10.1007/s11071-012-0565-1
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11071-012-0565-1