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On the Iterative Solution of Semidefinite Eigenvalue Problems

Published online by Cambridge University Press:  04 July 2016

R. Craig Jr.
Affiliation:
The Boeing Company, Seattle, Washington
M. C. C. Bampton
Affiliation:
The Boeing Company, Seattle, Washington

Extract

The free vibration of an elastic system represented by a finite number of degrees of freedom leads to the problem of determining the eigenvectors and eigenvalues of the equation

where K and M are symmetric matrices of order n, and x is an n-dimensional vector of generalised co-ordinates. Under certain circumstances as, for example, when the matrices are of large order and only a few eigenvalues and eigenvectors are required, it is preferable to use an iterative procedure for solving eqn. (1) or an equation equivalent to it. However, when the system has one or more rigid-body degrees of freedom the stiffness matrix K is singular. This precludes an iterative solution.

Type
Technical Notes
Copyright
Copyright © Royal Aeronautical Society 1971 

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References

1. Hurty, W. C. and Rubenstein, M. F. Dynamics of Structures, Prentice-Hall, Englewood Cliffs, NJ, pp 167173, 249-253, 1964.Google Scholar
2. Fraeijs De Veubeke, B. M. Iteration in Semi-definite Eigenvalue Problems. J Aeronaut Sci, Vol 22, No 10, pp 710720, October 1955.Google Scholar
3. Dugundji, J. On the Calculation of Natural Modes of Free-Free Structures. J Aerospace Sci, Vol 28, No 2, pp 164166. February 1961.Google Scholar
4. Berman, J. H. and Sklerov, J. Calculation of Natural Modes of Vibration in Three-dimensional Space. AIAA Journal, Vol 3, No 1, pp 158160. January 1965.Google Scholar
5. Bisplinghoff, R. L., Ashley, H. and Halfman, R. L. Aeroelasticity, Addison-Wesley, Reading, Mass, pp 106114. 1955.Google Scholar
6. Gladwell, G. M. L. Branch Mode Analysis of Vibration Systems. J Sound Vibration, Vol 1, pp 4159, 1964.Google Scholar
7. Wilkinson, J. H. The Solution of Ill-Conditioned Linear Equations, Mathematical Methods for Digital Compu ters, Vol 2, John Wiley, New York, pp 6593. 1967.Google Scholar
8. Jennings, A. Natural Vibrations of a Free Structure, Aircraft Engineering, Vol 34, No 397, pp. 8183. March 1962.Google Scholar
9. Fox, L. An Introduction to Numerical Linear Algebra, Oxford, New York, pp 80, 106-108. 1965.Google Scholar