This note proposes a new method, based on convex programming, for solving the Linear Quadratic Problem (LQP) directly on the parameter space generated by the feedback control gain. All stabilizing controllers are mapped into a convex set; the problem is then formulated as a minimization of a linear function over this convex set. Its optimal solution furnishes, under certain conditions, the same feedback control gain obtained from the classical Riccati equation. Generalizations to decentralized control and output feedback control design are included. The theory is illustrated by some numerical examples.39119820
Abstract: The paper establishes a new procedure to obtain optimal control in the linear quadratic (L...
The decentralized control problem for linear dynamic systems is revisited using a parameter space ap...
We study the linear quadratic control problem from a representation-free point of view, and we show ...
Linear quadratic optimal control is a collective term for a class of optimal control problems involv...
This paper presents a new procedure for continuous and discrete-time linear control systems design. ...
This paper presents a new procedure for continuous and discrete-time linear control systems design. ...
Abstract—We consider the problem of constructing optimal decentralized controllers. We formulate thi...
The problem of finding an optimal control for a linear system when the cost functional to be minimiz...
The problem of finding an optimal decentralized controller is considered, where both the plant and t...
This paper provides some sufficient conditions for the stabilization of nonlinear quadratic systems ...
textabstractWe study a deterministic linear-quadratic (LQ) control problem over an infinite horizon,...
<正> The solvability of quadratic optimal control via output feedback is studied. It has been c...
Abstract — This paper presents a nonlinear control design method for robust stabilization and robust...
Digital Object Identifier : 10.1109/ACC.1997.609494In this paper the problem of designing a fixed s...
A method for determining the optimal control of unconstrained and linearly constrained linear dynami...
Abstract: The paper establishes a new procedure to obtain optimal control in the linear quadratic (L...
The decentralized control problem for linear dynamic systems is revisited using a parameter space ap...
We study the linear quadratic control problem from a representation-free point of view, and we show ...
Linear quadratic optimal control is a collective term for a class of optimal control problems involv...
This paper presents a new procedure for continuous and discrete-time linear control systems design. ...
This paper presents a new procedure for continuous and discrete-time linear control systems design. ...
Abstract—We consider the problem of constructing optimal decentralized controllers. We formulate thi...
The problem of finding an optimal control for a linear system when the cost functional to be minimiz...
The problem of finding an optimal decentralized controller is considered, where both the plant and t...
This paper provides some sufficient conditions for the stabilization of nonlinear quadratic systems ...
textabstractWe study a deterministic linear-quadratic (LQ) control problem over an infinite horizon,...
<正> The solvability of quadratic optimal control via output feedback is studied. It has been c...
Abstract — This paper presents a nonlinear control design method for robust stabilization and robust...
Digital Object Identifier : 10.1109/ACC.1997.609494In this paper the problem of designing a fixed s...
A method for determining the optimal control of unconstrained and linearly constrained linear dynami...
Abstract: The paper establishes a new procedure to obtain optimal control in the linear quadratic (L...
The decentralized control problem for linear dynamic systems is revisited using a parameter space ap...
We study the linear quadratic control problem from a representation-free point of view, and we show ...