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KKNN Seminar Taipei, Taiwan, Dec. 7-8, 2000. SIMPLIFIED ALGEBRAIC METHOD FOR COMPUTING EIGENPAIR SENSITIVITIES OF DAMPED SYSTEM. * Hong-Ki Jo 1) , Kyu-Sik Park 2) , Hye-Rin Shin 3) and In-Won Lee 4) 1) ~ 3) Graduate Student, Department of Civil Engineering, KAIST
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KKNN Seminar Taipei, Taiwan, Dec. 7-8, 2000 SIMPLIFIED ALGEBRAIC METHOD FOR COMPUTING EIGENPAIR SENSITIVITIES OF DAMPED SYSTEM *Hong-Ki Jo1), Kyu-Sik Park2), Hye-Rin Shin3) and In-Won Lee4) 1) ~ 3) Graduate Student, Department of Civil Engineering, KAIST 4) Professor, Department of Civil Engineering, KAIST
OUTLINE • INTRODUCTION • PREVIOUS STUDIES • PROPOSED METHOD • NUMERICAL EXAMPLE • CONCLUSIONS
INTODUCTION • Objective of Study - To find efficient sensitivity method of eigenvalues and eigenvectors of damped systems. • Applications of Sensitivity Analysis - Determination of the sensitivity of dynamic responses - Optimization of natural frequencies and mode shapes - Optimization of structures subject to natural frequencies.
Problem Definition - Eigenvalue problem of damped system (N-space) (1)
- State space equation (2N-space) (2) - Normalization condition (3)
- Objective Given: Find: * indicates derivatives with respect to design variables (length, area, moment of inertia, etc.)
PREVIOUS STUDIES • Q. H. Zeng, “Highly Accurate Modal Method for • Calculating Eigenvector Derivatives in Viscous • Damping System,” AIAA Journal, Vol. 33, No. 4, pp. • 746-751, 1995. (4) (5) -many eigenpairs are required to calculate eigenvector derivatives. (2N-space)
Sondipon Adhikari, “Calculation of Derivative of Complex Modes Using Classical Normal Modes,” Computer & Structures, Vol. 77, No. 6, pp. 625-633, 2000. (6) -many eigenpairs are required to calculate eigenvector derivatives. (N-space) - applicable only when the elements of C are small.
I. W. Lee, D. O. Kim and G. H. Jung, “Natural Frequency and Mode Shape Sensitivities of Damped Systems: part I, Distinct Natural Frequencies,” Journal of Sound and Vibration, Vol. 223, No. 3, pp. 399-412, 1999. • I. W. Lee, D. O. Kim and G. H. Jung, “Natural Frequency and Mode Shape Sensitivities of Damped Systems: part II, Multiple Natural Frequencies,” Journal of Sound and Vibration, Vol. 223, No. 3, pp. 413-424, 1999.
Lee’s method (1999) (7) (8) - the corresponding eigenpairs only are required. (N-space) -the coefficient matrix is symmetric and non-singular. - eigenvalue and eigenvector derivatives are obtained separately.
PROPOSED METHOD • Rewriting basic equations - Eigenvalue problem (9) - Normalization condition (10)
Differentiating eq.(9) with respect to design variable (11) • Differentiating eq.(10) with respect to design variable (12)
Combining eq.(11) and eq.(12) into a single matrix (13) • - the corresponding eigenpairs only are required. (N-space) • - the coefficient matrix is symmetric and non-singular. • eigenpair derivatives are obtained simultaneously.
v1 v2 • NUMERICAL EXAMPLE • Cantilever beam with lumped dampers Material Properties System Data Number of elements : 20 Number of nodes : 21 Number of DOF : 40 Design parameter : depth of beam
Analysis Methods • Zeng’s method (1995) • Lee’s method (1999) • Proposed method • Comparisons • Solution time (CPU)
Mode number Eigenvalue Eigenvalue derivative 1 -0.0035 - 1.0868i 0.0010 - 0.2997i 2 -0.0035 + 1.0868i 0.0010 + 0.2997i 3 -0.0203 - 6.0514i 0.0072 - 1.3173i 4 -0.0203 + 6.0514i 0.0072 + 1.3173i 5 -0.0422 - 14.7027i 0.0140 - 2.4536i 6 -0.0422 + 14.7027i 0.0140 + 2.4536i 7 -0.0719 - 24.7343i 0.0189 - 3.1194i 8 -0.0719 + 24.7343i 0.0189 + 3.1194i -0.1106 + 35.3632i 9 -0.1106 - 35.3632i 0.0213 - 3.4203i 10 0.0213 + 3.4203i • Results of Analysis (Eigenvalue)
DOF number Eigenvector Eigenvector derivative 1 0.0013 + 0.0013i -0.0004 - 0.0004i 2 0.0050 + 0.0050i -0.0015 - 0.0015i 3 0.0049 + 0.0049i -0.0015 - 0.0015i 4 0.0096 + 0.0096i -0.0029 - 0.0029i 5 0.0108 + 0.0108i -0.0033 - 0.0032i 6 0.0139 + 0.0139i -0.0042 - 0.0042i 7 0.0188 + 0.0188i -0.0056 - 0.0056i 8 0.0179 + 0.0178i -0.0054 - 0.0053i 9 0.0287 + 0.0286i -0.0086 - 0.0085i 10 0.0215 + 0.0215i -0.0064 - 0.0064i • Results of Analysis (First eigenvector)
CPU time Method Ratio (sec) Zeng’s method 184.05 115.8 Lee’s method 2.21 1.4 Proposed method 1.59 1.0 • CPU time for 40 Eigenpairs
200 184.05 150 CPU time (sec) 100 Improvement about 99% 61.47 50 2.21 Δ Δ Δ Δ Δ Δ Δ Δ 0 1.59 5 10 15 20 25 30 35 40 Modes : Zeng’s method (Using full modes(40), exact solution) : Zeng’s method (Using two modes(2), 5% error) : Lee’s method (Exact solution) : Proposed method(Exact solution) Fig 1. Comparison with previous method
2.5 2.21 Improvement about 25% 2 Δ 1.59 1.5 Δ CPU time (sec) Δ Δ 1 Δ Δ 0.5 Δ Δ 0 5 10 15 20 25 30 35 40 Modes Fig 2. Comparison with Lee’s method : Lee’s method (Exact solution) : Proposed method(Exact solution)
CONCLUSIONS • Proposed method • - is composed of simple algorithm • - guarantees numerical stability • - reduces the CPU time. An efficient eigen-sensitivity technique !
APPENDIX • Numerical Stability • The determinant property (14)
Then (15)
Arranging eq.(15) (16) Using the determinant property of partitioned matrix (17)
Therefore (18) Numerical Stability is Guaranteed.
Lee’s method (1999) • Differentiating eq.(1) with respect to design variable (19) • Pre-multiplying each side of eq.(19) by gives eigenvalue derivative. (20)
Differentiating eq.(3) with respect to design variable (21) • Combining eq.(19) and eq.(21) into a matrix gives eigenvector derivative. (22)
