State feedback \(\ell{}_ 1\)-optimal controllers can be dynamic
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Publication:1199079
DOI10.1016/0167-6911(92)90092-7zbMath0767.93030OpenAlexW1992797887MaRDI QIDQ1199079
Ignacio J. Diaz-Bobillo, Munther A. Dahleh
Publication date: 16 January 1993
Published in: Systems \& Control Letters (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0167-6911(92)90092-7
Feedback control (93B52) Discrete-time control/observation systems (93C55) Synthesis problems (93B50)
Related Items (13)
Optimization of linear systems subject to bounded exogenous disturbances: the invariant ellipsoid technique ⋮ \(l_{\infty}\)-gain performance analysis for two-dimensional Roesser systems with persistent bounded disturbance and saturation nonlinearity ⋮ Polyhedral estimation of \(\mathcal{L}_1\) and \(\mathcal{L}_\infty\) incremental gains of nonlinear systems ⋮ Optimal design for discrete-time linear systems via new performance index ⋮ Robust stabilization of uncertain systems with persistent disturbance and a class of non-linear actuators ⋮ Simultaneous performance achievement via compensator blending ⋮ Rejection of persistent-bounded disturbances in continuous time-delay systems using observer-based feedback ⋮ Controller design for plants with structured uncertainty ⋮ On static feedback for the ℓ 1 and other optimal control problems ⋮ Internal behaviour provided by nonlinear \(l_{1}\)-optimal controllers ⋮ On nonlinear state feedback controllers for persistent disturbance rejection ⋮ Unnamed Item ⋮ Nonlinear state feedback for \(\ell^ 1\) optimal control
Cites Work
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- A course in \(H_{\infty}\) control theory
- An algebraic Riccati equation approach to \(H^{\infty}\) optimization
- A simple solution to the \(\ell ^ 1\) optimization problem
- \(\ell^ 1\)-optimal control of multivariable systems with output norm constraints
- Mixed sensitivity minimization problems with rational \(\ell^ 1\)-optimal solutions
- State-space solutions to standard H/sub 2/ and H/sub infinity / control problems
- <tex>l^{1}</tex>-optimal feedback controllers for MIMO discrete-time systems
- Two properties of l/sub 1/-optimal controllers
- Optimal rejection of persistent disturbances, robust stability, and mixed sensitivity minimization
- Minimization of the maximum peak-to-peak gain: the general multiblock problem
- l/sub 1/-optimality of feedback control systems: the SISO discrete-time case
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