Complex symmetric matrices

B. D. Craven

doi:10.1017/S1446788700007588

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It is well known that a real symmetric matrix can be diagonalised by an orthogonal transformation. This statement is not true, in general, for a symmetric matrix of complex elements. Such complex symmetric matrices arise naturally in the study of damped vibrations of linear systems. It is shown in this paper that a complex symmetric matrix can be diagonalised by a (complex) orthogonal transformation, when and only when each eigenspace of the matrix has an orthonormal basis; this implies that no eigenvectors of zero Euclidean length need be included in the basis. If the matrix cannot be diagonalised, then it has at least one invariant subspace which consists entirely of vectors of zero Euclidean length.

References

[1]Wellstein, J., ‘Über symmetrische, alternierende und orthogonale Normalformen von Matrizen’, J. für reine und angew. Math. 163 (1930), 166–182.CrossRef Google Scholar

[2]Gantmacher, F., The Theory of Matrices, Vol. 2. (Chelsea, 1959/1964.)Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Anderson, P. J. and Loizou, G. 1975. A Jacobi type method for complex symmetric matrices. Numerische Mathematik, Vol. 25, Issue. 4, p. 347.

Choudhury, Dipa and Horn, Roger A. 1987. An analog of the singular value decomposition for complex orthogonal equivalence. Linear and Multilinear Algebra, Vol. 21, Issue. 2, p. 149.

Schneider, D. J. and Freed, J. H. 1989. Advances in Chemical Physics. Vol. 73, Issue. , p. 387.

Frazer, L. Neil and Fryer, Gerard J. 1989. Useful properties of the system matrix for a homogeneous anisotropic visco-elastic solid. Geophysical Journal International, Vol. 97, Issue. 1, p. 173.

Freund, Roland W. 1992. Conjugate Gradient-Type Methods for Linear Systems with Complex Symmetric Coefficient Matrices. SIAM Journal on Scientific and Statistical Computing, Vol. 13, Issue. 1, p. 425.

Farhat, Charbel Macedo, Antonini Lesoinne, Michel Roux, Francois-Xavier Magoulès, Frédéric and Bourdonnaie, Armel de La 2000. Two-level domain decomposition methods with Lagrange multipliers for the fast iterative solution of acoustic scattering problems. Computer Methods in Applied Mechanics and Engineering, Vol. 184, Issue. 2-4, p. 213.

Danciger, Jeffrey 2006. A min–max theorem for complex symmetric matrices. Linear Algebra and its Applications, Vol. 412, Issue. 1, p. 22.

Garcia, Stephan Ramon 2008. Recent Advances in Matrix and Operator Theory. Vol. 179, Issue. , p. 169.

Combot, Thierry 2012. Non-integrability of the equal mass n-body problem with non-zero angular momentum. Celestial Mechanics and Dynamical Astronomy, Vol. 114, Issue. 4, p. 319.

Panteley, Elena and El-Ati, Ali 2013. On Practical Stability of a Network of Coupled Nonlinear Limit-Cycle Oscillators. p. 1548.

Studziński, Michał and Przybylska, Maria 2013. Darboux points and integrability analysis of Hamiltonian systems with homogeneous rational potentials. Physica D: Nonlinear Phenomena, Vol. 249, Issue. , p. 1.

Combot, Thierry 2013. Integrability conditions at order 2 for homogeneous potentials of degree −1. Nonlinearity, Vol. 26, Issue. 1, p. 95.

Nabi-Abdolyousefi, Marzieh 2014. Controllability, Identification, and Randomness in Distributed Systems. p. 39.

COMBOT, THIERRY and WATERS, THOMAS 2015. Integrability conditions of geodesic flow on homogeneous Monge manifolds. Ergodic Theory and Dynamical Systems, Vol. 35, Issue. 1, p. 111.

Hopkins, Ben Miroshnichenko, Andrey N. Poddubny, Alexander and Kivshar, Yuri 2015. Fano Resonance Enhanced Nonreciprocal Absorption and Scattering of Light. Photonics, Vol. 2, Issue. 2, p. 745.

Pozza, Stefano Pranić, Miroslav S. and Strakoš, Zdeněk 2016. Gauss quadrature for quasi-definite linear functionals. IMA Journal of Numerical Analysis, p. dnw032.

Hopkins, Ben Poddubny, Alexander N. Miroshnichenko, Andrey E. and Kivshar, Yuri S. 2016. Circular dichroism induced by Fano resonances in planar chiral oligomers. Laser & Photonics Reviews, Vol. 10, Issue. 1, p. 137.

Spee, C. de Vicente, J. I. and Kraus, B. 2016. The maximally entangled set of 4-qubit states. Journal of Mathematical Physics, Vol. 57, Issue. 5,

Geraci, Gabriel Hopkins, Ben Miroshnichenko, Andrey E. Erkihun, Biniyam Neshev, Dragomir N. Kivshar, Yuri S. Maier, Stefan A. and Rahmani, Mohsen 2016. Polarisation-independent enhanced scattering by tailoring asymmetric plasmonic systems. Nanoscale, Vol. 8, Issue. 11, p. 6021.

Hopkins, B. Miroshnichenko, A. E. and Kivshar, Y. S. 2017. Recent Trends in Computational Photonics. Vol. 204, Issue. , p. 285.

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