In this paper infinite horizon optimal control problems for nonlinear high-dimensional dynamical systems are studied. Nonlinear feedback laws can be computed via the value function characterized as the unique viscosity solution to the corresponding Hamilton–Jacobi–Bellman (HJB) equation which stems from the dynamic programming approach. However, the bottleneck is mainly due to the curse of dimensionality, and HJB equations are solvable only in a relatively small dimension. Therefore, a reduced-order model is derived for the dynamical system, using the method of proper orthogonal decomposition (POD). The resulting errors in the HJB equations are estimated by an a priori error analysis, which is utilized in the numerical approximation to ensu...
© 2018 Society for Industrial and Applied Mathematics. A procedure for the numerical approximation o...
We present an accelerated algorithm for the solution of static Hamilton–Jacobi–Bellman equations rel...
AbstractA new approach for solving finite-time horizon feedback control problems for distributed par...
In this paper infinite horizon optimal control problems for nonlinear high-dimensional dynamical sys...
In the Dynamic Programming approach to optimal control problems a crucial role is played by the valu...
The Dynamic Programming approach allows to compute a feedback control for nonlinear problems, but su...
Solving optimal control problems via Dynamic Programming is a difficult task that suffers for the”cu...
In this paper, we investigate infinite horizon optimal control problems for parametrized partial dif...
We investigate feedback control for infinite horizon optimal control problems for partial differenti...
In the dynamic programming approach to optimal control problems a crucial role is played by the valu...
In the dynamic programming approach to optimal control problems a crucial role is played by the valu...
The classical dynamic programming (DP) approach to optimal control problems is based on the characte...
In this article, we consider an iterative adaptive dynamic programming (ADP) algorithm within the Ha...
We consider an optimal control problem where the dynamics is given by the propagation of a one-dimen...
The article is devoted to the analysis of optimal control problems with infinite time horizon. These...
© 2018 Society for Industrial and Applied Mathematics. A procedure for the numerical approximation o...
We present an accelerated algorithm for the solution of static Hamilton–Jacobi–Bellman equations rel...
AbstractA new approach for solving finite-time horizon feedback control problems for distributed par...
In this paper infinite horizon optimal control problems for nonlinear high-dimensional dynamical sys...
In the Dynamic Programming approach to optimal control problems a crucial role is played by the valu...
The Dynamic Programming approach allows to compute a feedback control for nonlinear problems, but su...
Solving optimal control problems via Dynamic Programming is a difficult task that suffers for the”cu...
In this paper, we investigate infinite horizon optimal control problems for parametrized partial dif...
We investigate feedback control for infinite horizon optimal control problems for partial differenti...
In the dynamic programming approach to optimal control problems a crucial role is played by the valu...
In the dynamic programming approach to optimal control problems a crucial role is played by the valu...
The classical dynamic programming (DP) approach to optimal control problems is based on the characte...
In this article, we consider an iterative adaptive dynamic programming (ADP) algorithm within the Ha...
We consider an optimal control problem where the dynamics is given by the propagation of a one-dimen...
The article is devoted to the analysis of optimal control problems with infinite time horizon. These...
© 2018 Society for Industrial and Applied Mathematics. A procedure for the numerical approximation o...
We present an accelerated algorithm for the solution of static Hamilton–Jacobi–Bellman equations rel...
AbstractA new approach for solving finite-time horizon feedback control problems for distributed par...