A Survey of Recent Trends in Multiobjective Optimal Control—Surrogate Models, Feedback Control and Objective Reduction

Peitz, Sebastian; Dellnitz, Michael

doi:10.3390/mca23020030

Cited by 64 publications

(41 citation statements)

References 200 publications

(244 reference statements)

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“…Figure 9 shows both the stochastic behavior of the water flowing through the flood gatesV g and the given flow through the turbines,V t . As Figure 6 indicates, the inflow forecasts are updated every 24 h. Stochastic MPC algorithms can be posed in different ways, e.g., as scenario tree based algorithms (Raso et al, 2014), (Krishnamoorthy et al, 2018), or as multi objective based algorithms (Peitz and Dellnitz, 2018). Here, the focus is on a multi objective based algorithm.…”

Section: Simulation Resultsmentioning

confidence: 99%

Flood Management of Lake Toke: MPC Operation under Uncertainty

Menchacatorre¹,

Sharma²,

Furenes³

et al. 2019

Linköping Electronic Conference Proceedings

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A deterministic reference tracking model predictive control (MPC) is in use at Skagerak Kraft for flood management of Lake Toke in Norway. An operational inflow estimate is used to predict the optimal gate opening at Dalsfos power station, with required constraints set by the Norwegian Water Resource and Energy Directorate (NVE). The operational inflow estimate is based on the meteorological forecast, and is uncertain; this may lead to broken concession requirements and unnecessary release of water through the floodgates. Currently not utilized, the meteorological uncertainty is quantified by an ensemble of possible weather forecasts. In this paper, quantified inflow uncertainty is studied and how this affects the operation of the current, deterministic MPC solution. Next, we develop an alternative, stochastic MPC solution based on multi objective optimization which directly takes the inflow uncertainty into consideration. A comparison of the results from both approaches concludes that the stochastic MPC solution seems to give better control by reducing the amount of water released through the flood gates. Furthermore, with less frequent update of the control signal, the benefit of the stochastic MPC is expected to increase.

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Section: Simulation Resultsmentioning

confidence: 99%

Flood Management of Lake Toke: MPC Operation under Uncertainty

Menchacatorre¹,

Sharma²,

Furenes³

et al. 2019

Linköping Electronic Conference Proceedings

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“…the set of the best compromises, which is also called the Pareto set). Many methods have been developed for multicriteria optimal control, and they are usually classified in three categories [129]: scalarization techniques, continuation methods and set-oriented approaches. Here we use the -constraint scalarization method, which transforms the original multiobjective problem into a finite set of single-objective optimal control problems.…”

Section: Multicriteria Optimal Controlmentioning

confidence: 99%

Using optimal control to understand complex metabolic pathways

Tsiantis

Banga

2020

Preprint

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Background: We revisit the idea of explaining and predicting dynamics in biochemical pathways from first-principles. A promising approach is to exploit optimality principles that can be justified from an evolutionary perspective. In the context of the cell, several previous studies have explained the dynamics of simple metabolic pathways exploiting optimality principles in combination with dynamic models, i.e. using an optimal control framework. For example, dynamics of gene expression in small metabolic models can be explained assuming that cells have developed optimal adaptation strategies. Most of these works have considered rather simplified representations, such as small linear pathways, or reduced networks with a single branching point.Results: Here we consider the extension of this approach to more realistic scenarios, i.e. biochemical pathways of arbitrary size and structure. We first show that exploiting optimality principles for these networks poses great challenges due to the complexity of the associated optimal control problems. Second, in order to surmount such challenges, we present a computational framework based on multicriteria optimal control which has been designed with scalability and efficiency in mind, extending several recent methods. This framework includes mechanisms to avoid common pitfalls, such as local optima, unstable solutions or excessive computation time. We illustrate its performance with several case studies considering the central carbon metabolism of S. cerevisiae and B. subtilis. In particular, we consider metabolic dynamics during nutrient shift experiments. Conclusions:We show how multi-objective optimal control can be used to predict temporal profiles of enzyme activation and metabolite concentrations in complex metabolic pathways. Further, we show how the multicriteria approach allows us to consider general cost/benefit trade-offs that have been likely favored by evolution. In this study we have considered metabolic pathways, but this computational framework can also be applied to analyze the dynamics of other complex pathways, such as signal transduction networks.

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“…First, we briefly present some basic aspects of multi-objective optimization problems (MOPs) required for the understanding of this paper. For a more thorough discussion, we refer the interested reader, e.g., to References [12,29,30].…”

Section: Multi-objective Optimizationmentioning

confidence: 99%

“…−→ p = 10 −→ p = 5 −→ p = 1 −→ p = −1 Figure 11. Optimal ∆ p,−1 one-point archives A for the connected Pareto front P 1 given by Equation (12) with q = −1 and different values of p: In all cases, the archives are located in the line x = y.…”

Section: Optimal Archives For Discretized Spherical Pareto Frontsmentioning

confidence: 99%

“…The Hausdorff distance d H (e.g., Reference [1]) measures how far two subsets of a metric space are from each other. Due to its properties, it is frequently used in many research areas such as computer vision [2][3][4], fractal geometry [5], the numerical computation of attractors in dynamical systems [6][7][8], or convergence of multi-objective algorithms to the Pareto set/front of a given multi-objective optimization problem [9][10][11][12][13][14][15]. One possible drawback of the classical Hausdorff distance, however, is that it punishes single outliers which leads to inequitable performance evaluations in some cases.…”

Section: Introductionmentioning

confidence: 99%

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The Averaged Hausdorff Distances in Multi-Objective Optimization: A Review

2019

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A brief but comprehensive review of the averaged Hausdorff distances that have recentlybeen introduced as quality indicators in multi-objective optimization problems (MOPs) is presented.First, we introduce all the necessary preliminaries, definitions, and known properties of thesedistances in order to provide a stat-of-the-art overview of their behavior from a theoretical pointof view. The presentation treats separately the definitions of the (p, q)-distances GDp,q, IGDp,q, and Δp,q for finite sets and their generalization for arbitrary measurable sets that covers as an importantexample the case of continuous sets. Among the presented results, we highlight the rigorousconsideration of metric properties of these definitions, including a proof of the triangle inequalityfor distances between disjoint subsets when p, q ≥ 1, and the study of the behavior of associatedindicators with respect to the notion of compliance to Pareto optimality. Illustration of these resultsin particular situations are also provided. Finally, we discuss a collection of examples and numericalresults obtained for the discrete and continuous incarnations of these distances that allow for anevaluation of their usefulness in concrete situations and for some interesting conclusions at the end,justifying their use and further study.

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A Survey of Recent Trends in Multiobjective Optimal Control—Surrogate Models, Feedback Control and Objective Reduction

Cited by 64 publications

References 200 publications

Flood Management of Lake Toke: MPC Operation under Uncertainty

Flood Management of Lake Toke: MPC Operation under Uncertainty

Using optimal control to understand complex metabolic pathways

The Averaged Hausdorff Distances in Multi-Objective Optimization: A Review

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