A necessary and sufficient criterion for the stability of a convex set of matrices
From MaRDI portal
Publication:5288774
DOI10.1109/9.250532zbMath0777.93071OpenAlexW1978148091MaRDI QIDQ5288774
Publication date: 22 August 1993
Published in: IEEE Transactions on Automatic Control (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1109/9.250532
Related Items
On the 45° -Region and the uniform asymptotic stability of classes of second order parameter-varying and switched systems ⋮ On the stability of a convex set of matrices ⋮ On stability of parametrized families of polynomials and matrices ⋮ On nonsingularity of a polytope of matrices ⋮ Sufficient and necessary conditions for the stability of second-order switched linear systems under arbitrary switching ⋮ Stability of matrix polytopes with a dominant vertex and implications for system dynamics ⋮ Convex invertible cones and the Lyapunov equation ⋮ The Lyapunov order for real matrices ⋮ Convex invertible cones of matrices -- a unified framework for the equations of Sylvester, Lyapunov and Riccati ⋮ A characterization of convex cones of matrices with constant regular inertia ⋮ Remarks on the spectrum of a compact convex set of compact operators ⋮ Singularity conditions for the non-existence of a common quadratic Lyapunov function for pairs of third order linear time invariant dynamic systems
