Kang-Min Choi 1) , Woon-Hak Kim 2) and In-Won Lee 3)

1. The Fourteenth KKNN Semminar on Civil Engineering Kyoto International Conference Hall, Kyoto, Japan Natural Frequencies and Mode Shape Sensitivities of Damped Systems with Multiple Natural Frequencies Kang-Min Choi1), Woon-Hak Kim2) and In-Won Lee3) 1) Graduate Student, Department of Civil Engineering, KAIST 2) Professor, Department of Civil Engineering, Hankyung Univ. 3) Professor, Department of Civil Engineering, KAIST

2. OUTLINE INTRODUCTION  PROPOSED METHOD  NUMERICAL EXAMPLES  CONCLUSIONS

3. INTODUCTION Applications of sensitivity analysis are ● determination of the sensitivity of dynamic response ● optimization of natural frequencies and mode shapes ● optimization of structures subject to natural frequencies  To find the derivatives of eigenvalues and eigenvectors of damped systems with multiple eigenvalues according to design variables.  Typical structures have many multiple or nearly equal eigenvalues, due to structural symmetries.

4. ♦ Problem Definition ● Eigenvalue problem of damped system (1)

5. ● Objective Given: Find: * represents the derivative of with respect design variable α (length, area, moment of inertia, etc.)

6. PROPOSED METHOD ♦ Basic Equations ● Eigenvalue problem (2) ● Orthonormalization condition (3)

7. ● Adjacent eigenvectors (4) where T is an orthogonal transformation matrix and its order m (5)

8. ♦ Rewriting Basic Equations ● Another eigenvalue problem (6) ● Orthonormalization condition (7)

9. Differentiating eq.(6) with respect to design parameter α (8) Differentiating eq.(7) with respect to design parameter α (9)

10. Combining eq.(8) and eq.(9) into a single matrix (10) ● It maintains N-space without use of state space equation. ● Eigenpair derivatives are obtained simultaneously. ● It requires only corresponding eigenpair information. ● Numerical stability is guaranteed.

11. ♦ Numerical Stability ● Determinant property (11)

12. Then, (12) (13)

13. Arranging eq.(12) (14) Using the determinant property of partitioned matrix (15)

14. Therefore (16) Numerical Stability is Guaranteed.

15. NUMERICAL EXAMPLES ♦Cantilever Beam (proportionally damped system)

16. ●Results of Analysis

18. ♦ 5-DOF Non-proportional Damped System

19. ●Results of Analysis

21. CONCLUSIONS • ♦ Proposed Method • ● is simple • ● guarantees numerical stability • An efficient eigensensitivity method for the damped system with multiple eigenvalues

22. Thank you for your attention.