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Linear and Multilinear Algebra Volume 70, 2022 - Issue 19
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Research Article

A direct method for updating mass and stiffness matrices with submatrix constraints

Jiao XuSchool of Mathematics and Statistics, Hubei Normal University, Huangshi, People's Republic of China
&
Yongxin YuanSchool of Mathematics and Statistics, Hubei Normal University, Huangshi, People's Republic of ChinaCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0002-4809-9893
ORCID Icon
Pages 4266-4281 | Received 04 Jun 2020, Accepted 21 Dec 2020, Published online: 22 Jan 2021

References

  • Lin CS. Location of modeling errors using modal test data. AIAA J. 1990;28:1650–1654.
  • Wahlberg B, Ljung L. Hard frequency-domain model error bounds from least-squares like identification techniques. IEEE Trans Automat Control. 1992;37:900–912.
  • Cobb RG, Liebst BS. Structural damage identification using assigned partial eigenstructure. AIAA J. 1997;35:152–158.
  • Xie HQ. Sensitivity analysis of eigenvalue problem [PhD dissertation]. Nanjing University of Aeronautics and Astronautics; 2003 (in Chinese).
  • Baruch M. Optimization procedure to correct stiffness and flexibility matrices using vibration tests. AIAA J. 1978;16:1208–1210.
  • Berman A. Mass matrix correction using an incomplete set of measured modes. AIAA J. 1979;17:1147–1148.
  • Kabe AM. Stiffness matrix adjustment using mode data. AIAA J. 1985;23:1431–1436.
  • Lim TW. Submatrix approach to stiffness matrix correction using modal test data. AIAA J. 1990;28:1123–1130.
  • Chu MT, Driessel KR. The projected gradient method for least squares matrix approximations with spectral constraints. SIAM J Numer Anal. 1990;27:1050–1060.
  • Chen X, Chu MT. On the least squares solution of inverse eigenvalue problems. SIAM J Numer Anal. 1996;33:2417–2430.
  • Bai ZJ. Symmetric tridiagonal inverse quadratic eigenvalue problems with partial eigendata. Inverse Probl. 2007;24:015005.
  • Chu MT, Datta BN, Lin WW, et al. Spillover phenomenon in quadratic model updating. AIAA J. 2008;46:420–428.
  • Datta BN, Deng S, Sokolov VO, et al. An optimization technique for damped model updating with measured data satisfying quadratic orthogonality constraint. Mech Syst Signal Process. 2009;23:1759–1772.
  • Xie D. A numerical method of structure-preserving model updating problem and its perturbation theory. Appl Math Comput. 2011;217:6364–6371.
  • Mao X, Dai H. Finite element model updating with positive definiteness and no spill-over. Mech Syst Signal Process. 2012;28:387–398.
  • Yuan Q. Alternating direction method for structure-persevering finite element model updating problem. Appl Math Comput. 2013;223:461–471.
  • Zhao K, Yao G. Application of the alternating direction method for an inverse monic quadratic eigenvalue problem. Appl Math Comput. 2014;244:32–41.
  • Hajarian M, Abbas H. Least squares solutions of quadratic inverse eigenvalue problem with partially bisymmetric matrices under prescribed submatrix constraints. Comput Math Appl. 2018;76:1458–1475.
  • Yuan Y, Dai H. Inverse problems for symmetric matrices with a submatrix constraint. Appl Numer Math. 2007;57:646–656.
  • Yuan Y, Dai H. The nearness problems for symmetric matrix with a submatrix constraint. J Comput Appl Math. 2008;213:224–231.
  • Liu H, Dai H. Inverse problems for nonsymmetric matrices with a submatrix constraint. Appl Math Comput. 2007;189:1320–1330.
  • Xu WR, Chen GL, Gong Y. Submatrix constrained least-squares inverse problem for symmetric matrices from the design of vibrating structures. J Comput Appl Math. 2019;355:128–142.
  • Yuan Y. A model updating method for undamped structural systems. J Comput Appl Math. 2008;219:294–301.
  • Liu H, Yuan Y. An inverse problem for symmetric matrices in structural dynamic model updating. Chin J Eng Math. 2009;26:1083–1089.(in Chinese).
  • Paige CC, Saunders MA. Towards a generalized singular value decomposition. SIAM J Numer Anal. 1981;18:398–405.
  • Ben-Israel A, Greville TNE. Generalized inverses: theory and applications. 2nd ed. New York: Springer; 2003.
  • Aubin JP. Applied functional analysis. 2nd ed. New York: Wiley; 2000.
  • Rogers GS. Matrix derivatives. New York: Marcel Dekker, Inc; 1980. (Lecture notes in statistics; vol. 2).
  • Wei Y, Zhang N, Ng MK, et al. Tikhonov regularization for weighted total least squares problems. Appl Math Lett. 2007;20:82–87.
  • Zhang X. Matrix analysis and applications. 2nd ed. Beijing: Tsinghua University Press; 2013 (in Chinese).
  • Zhou X, Zhang DW, Wang LS. Updating finite element analytical models using modal test data. Struct Environ Eng. 1987;14:19–24 (in Chinese).
  • Lee ET, Eun HC. Correction of stiffness and mass matrices utilizing simulated measured modal data. Appl Math Model. 2009;33:2723–2729.

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