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Highly efficient general method for sensitivity analysis of eigenvectors with repeated eigenvalues without passing through adjacent eigenvectors

Gil Ho Yoon, Alberto Donoso, José C. Bellido, David Ruiz

2020International Journal for Numerical Methods in Engineering22 citationsDOI

Abstract

Summary It is well known that the sensitivity analysis of the eigenvectors corresponding to multiple eigenvalues is a difficult problem. The main difficulty is that for given multiple eigenvalues, the eigenvector derivatives can be computed for a specific eigenvector basis, the so‐called adjacent eigenvector basis. These adjacent eigenvectors depend on individual variables, which makes the eigenvector derivative calculation elaborate and expensive from a computational perspective. This research presents a method that avoids passing through adjacent eigenvectors in the calculation of the partial derivatives of any prescribed eigenvector basis. As our method fits into the adjoint sensitivity analysis , it is efficient for computing the complete Jacobian matrix because the adjoint variables are independent of each variable. Thus our method clarifies and unifies existing theories on eigenvector sensitivity analysis. Moreover, it provides a highly efficient computational method with a significant saving of the computational cost. Additional benefits of our approach are that one does not have to solve a deficient linear system and that the method is independent of the existence of repeated eigenvalue derivatives of the multiple eigenvalues. Our method covers the case of eigenvectors associated to a single eigenvalue. Some examples are provided to validate the present approach.

Topics & Concepts

Eigenvalues and eigenvectorsEigenvalue perturbationJacobian matrix and determinantMathematicsEigenvalues and eigenvectors of the second derivativeDefective matrixSensitivity (control systems)Modal matrixApplied mathematicsMatrix differential equationBasis (linear algebra)Matrix (chemical analysis)AlgorithmMathematical analysisDiagonalizable matrixSymmetric matrixGeometryPhysicsDifferential equationEngineeringMaterials scienceQuantum mechanicsComposite materialElectronic engineeringMatrix Theory and AlgorithmsTopology Optimization in EngineeringComposite Structure Analysis and Optimization