Inverse substructure method for model updating of structures

et al. 2013

Computers & Structures

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Calculation of eigensensitivity is usually time-consuming for a large-scale structure. This paper develops a substructuring method for computing the first, second and high order eigensensitivity.The local area of a structure is treated as an independent substructure to be analyzed. The eigensensitivity of global structure with respect to a design parameter are calculated from the eigensensitivity of a particular substructure that contains the design parameter, thus allowing a significant reduction in computational cost. The accuracy and efficiency of the substructuring method is proved by a frame structure and a highway bridge.

“…Thirdly, the number of parameters in each substructure is much smaller than that in the global structure. This improves the convergence of optimization process [23][24][25][26].…”

Section: Introductionmentioning

confidence: 91%

“…Substructuring technology is preferable for the analysis of large complex structures [18][19][20][21][22][23][24][25][26]. Firstly, it is possible to analyze each substructure independently, or even concurrently with parallel computing.…”

Section: Introductionmentioning

confidence: 99%

Substructuring approach to the calculation of higher-order eigensensitivity

Weng

Zhu

et al. 2013

Computers & Structures

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“…The basic idea of frequency domain methods is that modal parameters (such as frequencies and mode shapes) are functions of physical parameters. The modal parameters are extracted via modal identification methods 1 , and the structural parameters are subsequently identified using model updating techniques 2,3 . The time domain methods use the measured time history responses directly for damage detection.…”

Section: Introductionmentioning

confidence: 99%

Structural Damage Detection Using Auto/Cross-Correlation Functions Under Multiple Unknown Excitations

Int. J. Str. Stab. Dyn.

Law

et al. 2014

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Traditional structural system identification and damage detection methods use vibration responses under single excitation. This paper presents an auto/cross-correlation function-based method using acceleration responses under multiple ambient white noise or impact excitations. The auto/cross-correlation functions are divided into two parts. One is associated with the structural parameters and the other with the energy of the excitation. These two parts are updated sequentially using a two-stage method. Numerical and experimental studies are conducted to demonstrate the accuracy and robustness of the proposed method. The effects of measurement noise and number of measurement points on the identification results are also studied.

“…The substructural solutions are then assembled to recover the solutions of the global structure by imposing constraints on the interfaces. On the other hand, the substructuring approach can be used in an inverse manner to disassemble the properties of the global structure to the substructure level by satisfying the constraints at the interfaces [15][16][17][18][19][20][21]. After eliminating the rigid body components, the independent substructures can be singled out to be used for the static analysis, 2 Mathematical Problems in Engineering dynamic analysis, nonlinear analysis, fatigue analysis, and so forth.…”

Section: Introductionmentioning

confidence: 99%

“…This paper addresses some frequently encountered difficulties associated with the analysis of the free-free substructures when the authors studied the substructuring methods in the previous research [5,[9][10][11][12][13][14][15][16]. A new full-rank stiffness matrix is proposed, which leads to a well-conditioned eigenequation.…”

Section: Introductionmentioning

confidence: 99%

Construction of Stiffness and Flexibility for Substructure-Based Model Updating

Weng

Zhu

Mathematical Problems in Engineering

et al. 2013

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In substructuring methods, the substructures are independently analyzed under free-free conditions. For a free-free substructure, its stiffness matrix is singular and rank deficient due to rigid body motion. The variables associated with the inverse of the stiffness matrix are not easy to be accurately determined in the usual manner. This study expands on the previous research on the substructuring methods by taking a deeper look at the analysis of a free-free substructure. A well-conditioned stiffness matrix is constructed for the analysis of a free-free structure. Some difficulties associated with the analysis of the free-free substructures can be solved in a simple and effective way. The substructural eigensolutions and eigensensitivity are solved from the well-conditioned stiffness matrix, other than the singular stiffness matrix. The proposed well-conditioned eigenequation is accurate and efficient to calculate the substructural eigensolutions and eigensensitivity. The properties addressed in this paper are not limited to be used for the analysis of a free-free substructure in many substructuring methods, and they are promising to be generalized to a range of analysis relevant to a free-free structure.