Polyhedral control Lyapunov functions (PCLFs) are exploited in this paper to propose a linear model predictive control (MPC) formulation that guarantees a “large” domain of attraction (DoA) even for short horizon. In particular, the terminal region of the proposed finite-horizon MPC formulation is chosen as a level set of an appropriate PCLF. For small dimensional systems, this terminal region can be explicitly computed as an arbitrarily close approximation to the entire (infinite-horizon) stabilizable set. Global stability of the origin is guaranteed by using an “inflated” PCLF as terminal cost. The proposed MPC scheme can be formulated as a (small dimensional) quadratic programming problem by introducing one additional scalar variable. Nu...
This work presents an alternative way to formulate the stable Model Predictive Control (MPC) optimiz...
In this note, we investigate the stability of hybrid systems in closed-loop with model predictive co...
For discrete-time linear time-invariant systems with constraints on inputs and states, we develop an...
Polyhedral control Lyapunov functions (PCLFs) are exploited in this paper to propose a linear model ...
Polyhedral control Lyapunov functions (PCLFs) are exploited in finite-horizon linear model predictiv...
This paper is concerned with the design of stabilizing model predictive control (MPC) laws for const...
In this paper we investigate the stability of discrete-time PWA systems in closed-loop with quadrati...
MPC or model predictive control is representative of control methods which are able to handle inequa...
This article is concerned with the approximation of constrained continuous-time linear quadratic reg...
invariant sets, asymptotic stability. This paper is concerned with the design of stabilizing MPC con...
This paper describes a model predictive control (MPC) approach for discrete-time linear systems with...
This paper proposes a guaranteed feasible control allocation method based on the model predictive co...
vers io C Abstract: We propose a model predictive control (MPC) strategy for input-saturated polytop...
This paper presents a stability analysis tool for model predictive control (MPC) where control actio...
In this paper the formulation and stability of a double-layer model predictive control algorithm is ...
This work presents an alternative way to formulate the stable Model Predictive Control (MPC) optimiz...
In this note, we investigate the stability of hybrid systems in closed-loop with model predictive co...
For discrete-time linear time-invariant systems with constraints on inputs and states, we develop an...
Polyhedral control Lyapunov functions (PCLFs) are exploited in this paper to propose a linear model ...
Polyhedral control Lyapunov functions (PCLFs) are exploited in finite-horizon linear model predictiv...
This paper is concerned with the design of stabilizing model predictive control (MPC) laws for const...
In this paper we investigate the stability of discrete-time PWA systems in closed-loop with quadrati...
MPC or model predictive control is representative of control methods which are able to handle inequa...
This article is concerned with the approximation of constrained continuous-time linear quadratic reg...
invariant sets, asymptotic stability. This paper is concerned with the design of stabilizing MPC con...
This paper describes a model predictive control (MPC) approach for discrete-time linear systems with...
This paper proposes a guaranteed feasible control allocation method based on the model predictive co...
vers io C Abstract: We propose a model predictive control (MPC) strategy for input-saturated polytop...
This paper presents a stability analysis tool for model predictive control (MPC) where control actio...
In this paper the formulation and stability of a double-layer model predictive control algorithm is ...
This work presents an alternative way to formulate the stable Model Predictive Control (MPC) optimiz...
In this note, we investigate the stability of hybrid systems in closed-loop with model predictive co...
For discrete-time linear time-invariant systems with constraints on inputs and states, we develop an...