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A new approach in the analysis of linear systems with periodic coefficients for applications in rotorcraft dynamics

Published online by Cambridge University Press:  04 July 2016

D.-H. Wu
Affiliation:
Department of Mechanical Engineering, National Pingtung Polytechnic Institute, Pingtung, TaiwanROC
S.C. Sinha
Affiliation:
Nonlinear Systems Research Laboratory, Department of Mechanical Engineering, Auburn University, USA

Abstract

A numerical technique for the stability analysis of linear mechanical dynamic systems with periodically varying parameters is proposed. The technique is based on representation of the solution vector in terms of Chebyshev polynomials defined over the principal period. Two formulations have been presented. The first formulation is suitable for systems described by state space equations, while the second can be applied directly to a set of second order equations with periodically varying mass, damping and stiffness matrices. As an illustrative example, the flap-lag stability of a multi-bladed rotor is examined. The numerical accuracy and efficiency of the proposed technique is compared with standard numerical codes based on Runge-Kutta, Adams-Moulton and Gear algorithms. The results indicate that the suggested approach is by far the most efficient one, particularly for systems with larger dimensions.

Type
Research Article
Copyright
Copyright © Royal Aeronautical Society 1994 

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References

1. Friedmann, P. and Tong, P. Nonlinear flap lag dynamics of hinge-less helicopter blades in hover and in forward flight, J Sound Vib, 1973, 30, (l), pp 931.Google Scholar
2. Johnson, W. A perturbation solution of helicopter rotor flapping stability, NASA TM X-62, 1972, pp 165.Google Scholar
3. Johnson, W. Perturbation solution for the influence of forward flight on helicopter rotor flapping stability, NASA TM X-62, 1974, pp 361.Google Scholar
4. Crespo da Silva, M. and Hodges, D. The role of computerized symbolic manipulation in rotorcraft dynamic analysis, Computers Maths Appl, 1986, 12A, (1), pp 161172.Google Scholar
5. Friedmann, P. and Silverthorn, L.J. Aeroelastic stability of periodic systems with application to rotor blade flutter, AIAA J, 1974, 12, (11), pp 15591565.Google Scholar
6. Hsu, C.S. On approximating a general linear periodic system, J Math Anal Appl, 1974, 45, pp 234251.Google Scholar
7. Crimi, P.A. Method for analyzing the aeroelastic stability of a helicopter rotor in the forward flight, NASA CR-1332, 1969.Google Scholar
8. Peters, D.A. and Hohenemser, K.H. Application of the Floquet transition matrix to problems of lifting rotor stability, J Amer Hel Soc, 1971,16, (2), pp. 2533.Google Scholar
9. Friedmann, P. and Silverthorn, L.J. Aeroelastic stability of coupled flap-lag motion of hingeless helicopter blades at arbitrary advance ratio, J Sound Vib, 1975, 39, (4), pp 409428.Google Scholar
10. Friedmann, P. and Shamie, J. Aeroelastic stability of trimmed helicopter blades in forward flight, Vertica, 1979, 3, (2), pp 189211.Google Scholar
11. Hammond, C.E. An application of Floquet theory to the prediction of mechanical instability, J Amer Hel Soc, 1974,19, (4), pp 1423.Google Scholar
12. Friedmann, P., Hammond, C.E. and Woo, T.H. Efficient numerical treatment of periodic systems with application to stability problems, Int J Numer Meth Eng, 1977,11, pp 11171136.Google Scholar
13. Gaonkar, G.H., Simha prasad, D.S. and Sastry, D. On computing Floquet transition matrices of rotorcraft, J Amer Hel Soc, 1981, 26, (3), pp 5661.Google Scholar
14. Sinha, S.C., and Wu, D.-H., An efficient computational scheme for the analysis of periodic systems, J Sound Vib, 1991, 151, pp 91117.10.1016/0022-460X(91)90654-3Google Scholar
15. Fox, L. and Parker, I.B. Chebyshev Polynomials in Numerical Analysis, Oxford University Press, 1968.Google Scholar
16. Bellman, R. Introduction to Matrix Analysis, McGraw-Hill, 1970.Google Scholar
17. Coddington, E.A. and Levinson, N. Theory of Ordinary Differential Equations, McGraw Hill, 1955.Google Scholar
18. Ormiston, R.A. and Hodges, D.H. Linear flap-lag dynamics of hingeless helicopter rotor blades in hover, J Amer Hel Soc, 1972, 17, (2),pp 214.Google Scholar
19. Peters, D.A. Flap-lag stability of helicopter rotor blades in forward flight, J Amer Hel Soc, 1975, 20, (4), pp 213.Google Scholar
20. Wei, F-S, and Peters, D.A. Lag damping in autorotation by a perturbation method, 34th Annual National Forum of the American Helicopter Society, Washington DC, May 1978.Google Scholar
21. Hohenemser, K.H. and Yin, S.K. Some applications of the method of multi-blade coordinates, J Amer Hel Soc, 1972, 17, pp 312.Google Scholar