Rapid development of nonlinear control theory for application to challenging and complex problems is motivated by the fast technological development and demand for highly accurate control systems. In infinite-horizon nonlinear optimal control the essential difficulty is that no efficient analytical or numerical algorithm is available to derive exact expressions for optimal controls. This work concerns the numerical investigation of faux Riccati equation methods for control of nonlinear and linear time-varying (LTV) systems. These methods are attractive due to their simplicity and potentially wide applicability. Considered methods include state-dependent Riccati equation (SDRE) control and forward-propagating Riccati equation (FPRE) control....
Methods for solving non-linear control systems are still being developed. For many industrial device...
AbstractThis paper presents three approaches dealing with the feedback control of nonlinear analytic...
A study was conducted to demonstrate path planning using a novel finite horizon suboptimal controlle...
For output-feedback control of linear time-varying (LTV) and nonlinear systems, this paper focuses o...
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...
Pseudo-linear models of nonlinear systems use either a state-dependent coefficient or the Jacobian o...
This paper presents a novel state-dependent Riccati equation (SDRE) control approach with the purpos...
In many practical control problems the dynamics of the plant to be controlled are nonlinear. However...
A novel H2−H∞ State-dependent Riccati equation control approach is presented for providing a general...
This paper presents a novel $ {H_2} - {H_\infty } $ state-dependent Riccati equation (SDRE) control ...
State dependent Riccati equation (SDRE) plays an important role in nonlinear controller design. For ...
An optimized variant of the State Dependent Riccati Equations (SDREs) approach for nonlinear optimal...
This paper presents a case study of the design procedure of state-feedback controllers and estimator...
This paper considers the problem of optimal control of nonlinear single and multiple interconnected ...
Methods for solving non-linear control systems are still being developed. For many industrial device...
AbstractThis paper presents three approaches dealing with the feedback control of nonlinear analytic...
A study was conducted to demonstrate path planning using a novel finite horizon suboptimal controlle...
For output-feedback control of linear time-varying (LTV) and nonlinear systems, this paper focuses o...
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...
Pseudo-linear models of nonlinear systems use either a state-dependent coefficient or the Jacobian o...
This paper presents a novel state-dependent Riccati equation (SDRE) control approach with the purpos...
In many practical control problems the dynamics of the plant to be controlled are nonlinear. However...
A novel H2−H∞ State-dependent Riccati equation control approach is presented for providing a general...
This paper presents a novel $ {H_2} - {H_\infty } $ state-dependent Riccati equation (SDRE) control ...
State dependent Riccati equation (SDRE) plays an important role in nonlinear controller design. For ...
An optimized variant of the State Dependent Riccati Equations (SDREs) approach for nonlinear optimal...
This paper presents a case study of the design procedure of state-feedback controllers and estimator...
This paper considers the problem of optimal control of nonlinear single and multiple interconnected ...
Methods for solving non-linear control systems are still being developed. For many industrial device...
AbstractThis paper presents three approaches dealing with the feedback control of nonlinear analytic...
A study was conducted to demonstrate path planning using a novel finite horizon suboptimal controlle...