A sin 2 theorem for graded indefinite Hermitian matrices

@inproceedings{Truhar2002AS2,
  title={A sin 2 theorem for graded indefinite Hermitian matrices},
  author={Ninoslav Truhar and Ren-Cang Li},
  year={2002}
}
This paper gives double angle theorems that bound the change in an invariant subspace of an indefinite Hermitian matrix in the graded form H = D∗AD subject to a perturbation H → H̃ = D∗(A+ A)D. These theorems extend recent results on a definite Hermitian matrix in the graded form (Linear Algebra Appl. 311 (2000) 45) but the bounds here are more complicated in that they depend on not only relative gaps and norms of A as in the definite case but also norms of some J-unitary matrices, where J is… CONTINUE READING

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The rotation of eigenvectors by a perturbation III

  • C. Davis, W. M. Kahan
  • SIAM J. Numer. Anal. 7
  • 1970
Highly Influential
10 Excerpts

A note on the existence of the hyperbolic singular value decomposition

  • H. Zha
  • Linear Algebra Appl. 240
  • 1996
Highly Influential
12 Excerpts

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