Lyapunov diagonal semistability of real H-matrices
From MaRDI portal
Publication:1065900
DOI10.1016/0024-3795(85)90241-1zbMath0577.15015OpenAlexW2101521550MaRDI QIDQ1065900
Daniel Hershkowitz, Hans Schneider
Publication date: 1985
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Full work available at URL: http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.178.6204
Inequalities involving eigenvalues and eigenvectors (15A42) Hermitian, skew-Hermitian, and related matrices (15B57)
Related Items
Eigenvalue interlacing for certain classes of matrices with real principal minors, Stability analysis of diagonally equipotent matrices, On the span of Hadamard products of vectors, Maximal Lyapunov scaling factors and their applications in the study of Lyapunov diagonal semistability of block triangular matrices, Global asymptotic stability in a model of networks, Cones of real positive semidefinite matrices associated with matrix stability, On Lyapunov scaling factors of real symmetric matrices, Sufficient conditions for Schur and Hurwitz diagonal stability of complex interval matrices, Lyapunov diagonal semistability of acyclic matrices, Recent directions in matrix stability, Block diagonal semistability factors and Lyapunov semistability of block triangular matrices, Hermitian positive semidefinite matrices whose entries are 0 or 1 in Modulus∗, Sums of rank-one matrices and ranks of principal submatrices, Unifying Matrix Stability Concepts with a View to Applications, Olga, matrix theory and the Taussky unification problem
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Backward error analysis for linear systems associated with inverses of H- matrices
- Three types of matrix stability
- \(\mathcal A\mathcal L\wp\mathcal S\): Matrices with nonpositive off-diagonal entries
- Inertia theorems for matrices: the semidefinite case
- Unzerlegbare, nicht negative Matrizen
- Matrix Diagonal Stability and Its Implications
- Scalings of vector spaces and the uniqueness of lyapunov scaling factors
- Matrices Whose Powers are M-Matrices or Z-Matrices
- Positive diagonal solutions to the Lyapunov equations
- Stability and transient behavior of composite nonlinear systems
