2019
DOI: 10.3390/pr7040185
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Rare Event Chance-Constrained Optimal Control Using Polynomial Chaos and Subset Simulation

Abstract: This study develops a ccoc framework capable of handling rare event probabilities. Therefore, the framework uses the gpc method to calculate the probability of fulfilling rare event constraints under uncertainties. Here, the resulting cc evaluation is based on the efficient sampling provided by the gpc expansion. The subsim method is used to estimate the actual probability of the rare event. Additionally, the discontinuous cc is approximated by a differentiable function that is iteratively sharpened using a ho… Show more

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Cited by 11 publications
(6 citation statements)
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“…In general, stochastic nonlinear optimal control is computationally demanding and poses significant challenges to nonlinear optimization solvers. Distributed numerical frameworks for nonlinear optimal control 37 could be explored in the future to improve robustness and facilitate real‐time applications of the proposed methodology.…”
Section: Discussionmentioning
confidence: 99%
“…In general, stochastic nonlinear optimal control is computationally demanding and poses significant challenges to nonlinear optimization solvers. Distributed numerical frameworks for nonlinear optimal control 37 could be explored in the future to improve robustness and facilitate real‐time applications of the proposed methodology.…”
Section: Discussionmentioning
confidence: 99%
“…Piprek et al [9] provide a sampling approach to approximate the chance constraints in the formulation of optimal control problems for stochastic dynamical systems to capture rare events. The applicability of the proposed approach is demonstrated in a battery charging-discharging problem.…”
Section: Papers Presented In the Special Issuementioning
confidence: 99%
“…The general idea of the control approach of the paper is depicted in Figure 1: The desired trajectory is generated by a suitable method, e.g., geometric approaches [15,16], (robust) optimal control [17][18][19][20], or shortest path methods [21]. As the aircraft is generally never able to follow the path exactly, either due to imperfect planning or disturbances (e.g, wind or model errors), a deviation between the aircraft reference point R and the trajectory foot point F arises.…”
Section: Introductionmentioning
confidence: 99%