This study investigates the state-dependent Riccati equation (SDRE) controller for a class of second-order nonlinear systems. By fully exploiting the design degree of freedom (DOF) arising from the nonunique state-dependent coefficient (SDC) matrices, we explicitly calculate the ranges of control input via the SDRE scheme. Moreover, when a permissible control input is determined, we also explicitly parameterize the SDC matrices that result in the designated control value, in terms of system States and parameters, so the engineer can easily implement the scheme. Notably, this is the first analytical result that explores the range of control input using the design DOF of SDC matrices. In addition, by applying the analytical results, it is sho...
State-dependent coefficient matrix checking conditions are satisfied, the sets of all feasible SDC m...
This paper presents a novel state-dependent Riccati equation (SDRE) control approach with the purpos...
This paper describes a method for designing optimal feedback controllers with stability requirements...
This paper presents a case study of the design procedure of state-feedback controllers and estimator...
State dependent Riccati equation (SDRE) plays an important role in nonlinear controller design. For ...
In the area of nonlinear control systems, recently the easy-to-implement state-dependent Riccati equ...
AbstractThe State-Dependent Riccati Equation (SDRE) control strategy is one of the most efficient ap...
Designing a controller for nonlinear systems is difficult to be applied. Thus, it is usually based o...
A novel H2−H∞ State-dependent Riccati equation control approach is presented for providing a general...
This paper considers the problem of optimal control of nonlinear single and multiple interconnected ...
© 2015 Elsevier Ltd. Abstract Recently, the easy-to-implement state-dependent Riccati equation (SDRE...
In many practical control problems the dynamics of the plant to be controlled are nonlinear. However...
State-Dependent-Riccati-Equation (SDRE) is a recently introduced control method that attempts to est...
A novel H2−H∞ State-dependent Riccati equation control approach is presented for providing a general...
Many real life systems operate in restricted state space. This study presents a new controller desig...
State-dependent coefficient matrix checking conditions are satisfied, the sets of all feasible SDC m...
This paper presents a novel state-dependent Riccati equation (SDRE) control approach with the purpos...
This paper describes a method for designing optimal feedback controllers with stability requirements...
This paper presents a case study of the design procedure of state-feedback controllers and estimator...
State dependent Riccati equation (SDRE) plays an important role in nonlinear controller design. For ...
In the area of nonlinear control systems, recently the easy-to-implement state-dependent Riccati equ...
AbstractThe State-Dependent Riccati Equation (SDRE) control strategy is one of the most efficient ap...
Designing a controller for nonlinear systems is difficult to be applied. Thus, it is usually based o...
A novel H2−H∞ State-dependent Riccati equation control approach is presented for providing a general...
This paper considers the problem of optimal control of nonlinear single and multiple interconnected ...
© 2015 Elsevier Ltd. Abstract Recently, the easy-to-implement state-dependent Riccati equation (SDRE...
In many practical control problems the dynamics of the plant to be controlled are nonlinear. However...
State-Dependent-Riccati-Equation (SDRE) is a recently introduced control method that attempts to est...
A novel H2−H∞ State-dependent Riccati equation control approach is presented for providing a general...
Many real life systems operate in restricted state space. This study presents a new controller desig...
State-dependent coefficient matrix checking conditions are satisfied, the sets of all feasible SDC m...
This paper presents a novel state-dependent Riccati equation (SDRE) control approach with the purpos...
This paper describes a method for designing optimal feedback controllers with stability requirements...