Yuanbo Nie scite author profile

We show via examples that, when solving optimal control problems, representing the optimal state and input trajectory directly using interpolation schemes may not be the best choice. Due to the lack of considerations for solution trajectories in-between collocation points, large errors may occur, posing risks if this solution is to be applied. A novel solution representation method is proposed, capable of yielding a solution of much higher accuracy for the same discretization mesh. This is achieved by minimizing the integral of the residual error for the overall trajectory, instead of forcing the errors to be zero only at collocation points. In this way, the requirement for mesh resolution can be significantly reduced, leaving the problem dimensions relatively small. This particular formulation also avoids some of the drawbacks found in the earlier work of integrated residual minimization, leading to more efficient computations.

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How Should Rate Constraints be Implemented in Nonlinear Optimal Control Solvers?

Nie

Kerrigan

2018

IFAC-PapersOnLine

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Solving Dynamic Optimization Problems to a Specified Accuracy: An Alternating Approach Using Integrated Residuals

Nie

Kerrigan

2023

IEEE Trans. Automat. Contr.

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Yuanbo Nie

ICLOCS2: Try this Optimal Control Problem Solver Before you Try the Rest

Energy-efficient communication in mobile aerial relay-assisted networks using predictive control

Efficient and More Accurate Representation of Solution Trajectories in Numerical Optimal Control

How Should Rate Constraints be Implemented in Nonlinear Optimal Control Solvers?

Solving Dynamic Optimization Problems to a Specified Accuracy: An Alternating Approach Using Integrated Residuals

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