论文信息 - Improving Condensation Methods for Eigenvalue Problems via Rayleigh Functional

Improving Condensation Methods for Eigenvalue Problems via Rayleigh Functional

The dynamic analysis of structures using the nite element method leads to very large eigenvalue problems. Condensation is often required to reduce the number of degrees of freedom of these problems to manageable size. The (statically or dynamically) condensed problem can be considered as linearization of a matrix eigenvalue problem which is nonlinear with respect to the eigenparameter. As a consequence only a few natural frequencies can be obtained with suucient accuracy. We use the Rayleigh functional of the nonlinear problem to improve the eigenvalue approximations considerably. Two examples are presented to demonstrate the eeciency of the method.

Kai Rothey

[1] H. Voss. An Error Bound for Eigenvalue Analysis by Nodal Condensation , 1983 .

[2] Yee-Tak Leung,et al. An accurate method of dynamic substructuring with simplified computation , 1979 .

[3] K. Rothe. Least squares element method for boundary eigenvalue problems , 1992 .

[4] M. Geradin,et al. Error bounds for eigenvalue analysis by elimination of variables , 1971 .

[5] B. Irons. Structural eigenvalue problems - elimination of unwanted variables , 1965 .

[6] A. Leung. An accurate method of dynamic condensation in structural analysis , 1978 .

[7] K. Hadeler,et al. A minimax principle for nonlinear eigenvalue problems with applications to nonoverdamped systems , 1982 .

[8] G. G. Stokes. "J." , 1890, The New Yale Book of Quotations.

[9] D. L. Thomas. Errors in natural frequency calculations using eigenvalue economization , 1982 .