Inertia-Preserving Matrices
- 1 April 1991
- journal article
- Published by Society for Industrial & Applied Mathematics (SIAM) in SIAM Journal on Matrix Analysis and Applications
- Vol. 12 (2), 209-219
- https://doi.org/10.1137/0612017
Abstract
A real matrix A is inertia preserving if in $AD = \operatorname{in} D$, for every invertible diagonal matrix D. This class of matrices is a subset of the D-stable matrices and contains the diagonally stable matrices. In order to study inertia-preserving matrices, matrices that have no imaginary eigenvalues are characterized. This is used to characterize D-stability of stable matrices. It is also shown that irreducible, acyclic D-stable matrices are inertia preserving.
Keywords
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