Spin Stability of Undamped Flexible Structures Rotating About the Minor Axis

A method is presented for determining the nonlinear stability of undamped flexible structures spinning about the axis of minimum moment of inertia. Equations of motion are developed for structures that are free of applied forces and moments. The development makes use of a floating reference frame which follows the overall rigid body motion. Within this frame, elastic deformations are assumed to be given functions of n generalized coordinates. A transformation of variables is devised which shows the equivalence of the equations of motion to a Hamiltonian system with n+1 degrees of freedom. Using this equivalence, stability criteria are developed based on the normal form of the Hamiltonian. It is shown that a motion which is spin stable in the linear approximation may be unstable when nonlinear terms are included. A stability analysis of a simple flexible structure is provided to demonstrate the application of the stability criteria. Results from numerical integration of the equations of motion are shown to be consistent with the predictions of the stability analysis.

[1]  Thomas R. Kane,et al.  Spin stability of torque-free systems. I, II. , 1973 .

[2]  Leonard Meirovitch,et al.  A Method for the Liapunov Stability Analysis of Force-Free Dynamical Systems , 1971 .

[3]  Antonio Giorgilli,et al.  A computer program for integrals of motion , 1984 .

[4]  R. Bracewell,et al.  Rotation of Artificial Earth Satellites , 1958, Nature.

[5]  Jerrold E. Marsden,et al.  Stability of coupled rigid body and geometrically exact rods, block diagonalization and the energy, momentum method , 1990 .

[6]  P. C. Hughes,et al.  Liapunov stability of spinning satellites with long flexible appendages , 1971 .

[7]  Edmund Taylor Whittaker,et al.  A Treatise on the Analytical Dynamics of Particles and Rigid Bodies: THE GENERAL THEORY OF ORBITS , 1988 .

[8]  L. G. Khazin On the stability of hamiltonian systems in the presence of resonances PMM vol. 35, n≗3, 1971, pp. 423-431 , 1971 .

[9]  Stephen Wolfram,et al.  Mathematica: a system for doing mathematics by computer (2nd ed.) , 1991 .

[10]  P. Likins,et al.  Floating reference frames for flexible spacecraft , 1977 .

[11]  A. Lichtenberg,et al.  Regular and Stochastic Motion , 1982 .

[12]  A. Sokol'skii On the stability of an autonomous hamiltonian system with two degrees of freedom in the case of equal frequencies: PMM vol. 38, n≗5, 1974. pp. 791–799 , 1974 .

[13]  Jerrold E. Marsden,et al.  Hamiltonian structures and stability for rigid bodies with flexible attachments , 1987 .

[14]  V. Arnold,et al.  Dynamical Systems III , 1987 .

[15]  R. Pringle,et al.  On the stability of a body with connected moving parts. , 1966 .