A method for suboptimal design of nonlinear feedback systems
From MaRDI portal
Publication:2548782
DOI10.1016/0005-1098(71)90008-2zbMath0225.49027OpenAlexW2063889652MaRDI QIDQ2548782
Yoshikazu Nishikawa, Hidekiyo Itakura, Nobuo Sannomiya
Publication date: 1971
Published in: Automatica (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0005-1098(71)90008-2
Feedback control (93B52) Design techniques (robust design, computer-aided design, etc.) (93B51) Numerical methods in optimal control (49M99)
Related Items (22)
Construction of optimal feedback control for nonlinear systems via Chebyshev polynomials ⋮ Galerkin approximations of the generalized Hamilton-Jacobi-Bellman equation ⋮ Quadratic regulatory theory for analytic non-linear systems with additive controls ⋮ Sensitivity analysis of nonlinear feedback systems ⋮ A method for construction of suboptimal non-linear regulators by minimax algorithm† ⋮ Constrained dynamic systems estimation based on adaptive particle filter ⋮ Feedback control methodologies for nonlinear systems ⋮ Convergence of an iterative algorithm for solving Hamilton-Jacobi type equations ⋮ Suboptimal control for the nonlinear quadratic regulator problem ⋮ Suboptimal feedback control of linear periodic systems ⋮ Power-series approximations for the optimal feedback control of noisy nonlinear systems ⋮ Successive approximation approach of optimal control for nonlinear discrete-time systems ⋮ A solution of nonlinear TPBVP's occuring in optimal control ⋮ On infinite-time nonlinear quadratic optimal control ⋮ Design of nonlinear automatic flight control systems ⋮ Some numerical tests for an alternative approach to optimal feedback control ⋮ On the nonlinear optimal regulator problem ⋮ Approximate solutions to the time-invariant Hamilton-Jacobi-Bellman equation ⋮ A method for suboptimal design of nonlinear feedback systems ⋮ On the nonlinear regulator problem ⋮ A numerical approach to hybrid nonlinear optimal control ⋮ On synthesizing a state regulator for analytic non-linear discrete-time systems
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- An approximation theorem for linear optimal regulators
- A method for suboptimal design of nonlinear feedback systems
- On the optimal stabilization of nonlinear systems
- Additional results on sub–optimal feedback control of non–linear systems†
- Optimal Regulation of Nonlinear Dynamical Systems
This page was built for publication: A method for suboptimal design of nonlinear feedback systems
