On the computation of the optimal \(\mathbf H_\infty\) norms for two feedback control problems
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Publication:1301304
DOI10.1016/S0024-3795(98)10202-1zbMath0951.93027MaRDI QIDQ1301304
Chern-Shuh Wang, Quan-Fu Xu, Wen-Wei Lin
Publication date: 2 January 2001
Published in: Linear Algebra and its Applications (Search for Journal in Brave)
Cites Work
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- A course in \(H_{\infty}\) control theory
- A fast algorithm to compute the \(H_{\infty}\)-norm of a transfer function matrix
- A regularity result for the singular values of a transfer matrix and a quadratically convergent algorithm for computing its \(L_{\infty}\)-norm
- Inertia characteristics of self-adjoint matrix polynomials
- A bisection method for computing the \(H_{\infty}\) norm of a transfer matrix and related problems
- A numerically stable, structure preserving method for computing the eigenvalues of real Hamiltonian or symplectic pencils
- All optimal Hankel-norm approximations of linear multivariable systems and theirL,∞-error bounds†
- State-space solutions to standard H/sub 2/ and H/sub infinity / control problems
- Matrix Analysis
- A gradient method for computing the optimal H/sub infinity / norm
- On the Game Riccati Equations Arising in $H_\infty $ Control Problems
- Numerical solution of the discrete-time periodic Riccati equation
- Perturbation Theory for Algebraic Riccati Equations
- Existence Theorems for Positive Semidefinite and Sign Indefinite Stabilizing Solutions of $H_\infty $ Riccati Equations
- H/sub infinity /-control by state-feedback and fast algorithms for the computation of optimal H/sub infinity /-norms
- Updating a Rank-Revealing ULV Decomposition
- On a Matrix Riccati Equation of Stochastic Control
- A contribution to matrix quadratic equations
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