In this paper we construct high-order approximate solutions to the value function and optimal control for a finite horizon optimal control problem for time-varying discrete-time nonlinear systems. The method consists in expanding the dynamic programming equations (DPE) in a power series, collecting homogeneous polynomial terms and solving for the unknown coefficients from the known and previously computed data. The resulting high-order equations are linear difference equations for the unknown homogeneous terms and are solved backwards in time. The method is applied to construct high-order perturbation controllers around a nominal optimal trajectory
A class of nonlinear finite-horizon optimal control problems is studied. We propose a solution based...
This paper proposes a method to solve nonlinear finite-horizon optimal control problems of discrete-...
Abstract — This paper is concerned with a new discrete-time policy iteration adaptive dynamic progra...
This thesis studies approximate optimal control of nonlinear systems. Particular attention is given ...
Abstract We consider the general continuous time finite-dimensional deterministic system under a fin...
In this paper we consider discrete time stochastic optimal control prob- lems over infinite and fini...
This paper presents a data-based finite-horizon optimal control approach for discrete-time nonlinear...
The solution is given to a time-varying optimal state feedback problem with stochastic disturbances....
For systems that can only be locally stabilized, control laws and their effective regions are both i...
An approximation of the Hamilton-Jacobi-Bellman equation connected with the infinite horizon optimal...
This book covers the most recent developments in adaptive dynamic programming (ADP). The text begins...
The problem of controlling the state of a system, from a given initial condition, during a fixed tim...
There are many methods of stable controller design for nonlinear systems. In seeking to go beyond th...
Optimal control problems for a class of nonlinear time-varying differential-algebraic equations are ...
We present methods for locally solving the Dynamic Programming Equations (DPE) and the Hami...
A class of nonlinear finite-horizon optimal control problems is studied. We propose a solution based...
This paper proposes a method to solve nonlinear finite-horizon optimal control problems of discrete-...
Abstract — This paper is concerned with a new discrete-time policy iteration adaptive dynamic progra...
This thesis studies approximate optimal control of nonlinear systems. Particular attention is given ...
Abstract We consider the general continuous time finite-dimensional deterministic system under a fin...
In this paper we consider discrete time stochastic optimal control prob- lems over infinite and fini...
This paper presents a data-based finite-horizon optimal control approach for discrete-time nonlinear...
The solution is given to a time-varying optimal state feedback problem with stochastic disturbances....
For systems that can only be locally stabilized, control laws and their effective regions are both i...
An approximation of the Hamilton-Jacobi-Bellman equation connected with the infinite horizon optimal...
This book covers the most recent developments in adaptive dynamic programming (ADP). The text begins...
The problem of controlling the state of a system, from a given initial condition, during a fixed tim...
There are many methods of stable controller design for nonlinear systems. In seeking to go beyond th...
Optimal control problems for a class of nonlinear time-varying differential-algebraic equations are ...
We present methods for locally solving the Dynamic Programming Equations (DPE) and the Hami...
A class of nonlinear finite-horizon optimal control problems is studied. We propose a solution based...
This paper proposes a method to solve nonlinear finite-horizon optimal control problems of discrete-...
Abstract — This paper is concerned with a new discrete-time policy iteration adaptive dynamic progra...