Add to ORKGA deep learning approach for the approximation of the Hamilton-Jacobi-Bellman partial differential equation (HJB PDE) associated to the Nonlinear Quadratic Regulator (NLQR) problem. A state-dependent Riccati equation control law is first used to generate a gradient-augmented synthetic dataset for supervised learning. The resulting model becomes a warm start for the minimization of a loss function based on the residual of the HJB PDE. The combination of supervised learning and residual minimization avoids spurious solutions and mitigate the data inefficiency of a supervised learning-only approach. Numerical tests validate the different advantages of the proposed methodology.Comment: MTNS 202
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In this letter we propose a new computational method for designing optimal regulators for high-dimen...
Recent research has shown that supervised learning can be an effective tool for designing optimal fe...
We propose a neural network approach for solving high-dimensional optimal control problems. In parti...
In this paper we propose a new computational method for designing optimal regulators for high-dimens...
A gradient-enhanced functional tensor train cross approximation method for the resolution of the Ham...
Optimal control of diffusion processes is intimately connected to the problem of solving certain Ham...
The article of record as published may be found at http://dx.doi.org/10.1137/19M1288802Computing opt...
A supervised learning approach for the solution of large-scale nonlinear stabilization problems is p...
Computing optimal feedback controls for nonlinear systems generally requires solving Hamilton-Jacobi...
Recent research reveals that deep learning is an effective way of solving high dimensional Hamilton-...
Optimal control methods for linear systems have reached a substantial level of maturity, both in ter...
The article of record as published may be found at http://dx.doi.org/10.1109/LCSYS.2020.3034415In th...
Computing optimal feedback controls for nonlinear systems generally requires solving Hamilton-Jacobi...
Iterative linear quadratic regulator (iLQR) has gained wide popularity in addressing trajectory opti...
Abstract—In this paper, we present an empirical study of itera-tive least squares minimization of th...
In this letter we propose a new computational method for designing optimal regulators for high-dimen...
Recent research has shown that supervised learning can be an effective tool for designing optimal fe...
We propose a neural network approach for solving high-dimensional optimal control problems. In parti...
In this paper we propose a new computational method for designing optimal regulators for high-dimens...
A gradient-enhanced functional tensor train cross approximation method for the resolution of the Ham...
Optimal control of diffusion processes is intimately connected to the problem of solving certain Ham...