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27 results on '"KIRCHES, CHRISTIAN"'

1. Non-uniform Grid Refinement for the Combinatorial Integral Approximation

Author

Bestehorn, Felix, Hansknecht, Christoph, Kirches, Christian, and Manns, Paul

Subjects
Mathematics - Optimization and Control, 49M20, 90C11
Abstract

The combinatorial integral approximation (CIA) is a solution technique for integer optimal control problems. In order to regularize the solutions produced by CIA, one can minimize switching costs in one of its algorithmic steps. This leads to combinatorial optimization problems, which are called switching cost aware rounding problems (SCARP). They can be solved efficiently on one-dimensional domains but no efficient solution algorithms have been found so far for multi-dimensional domains. The CIA problem formulation depends on a discretization grid. We propose to reduce the number of variables and thus improve the computational tractability of SCARP by means of a non-uniform grid refinement strategy. We prove that the grid refinement preserves the approximation properties of the combinatorial integral approximation. Computational results are offered to show that the proposed approach is able to achieve, within a prescribed time limit, smaller duality gaps that does the uniform approach. For several large instances, a dual bound could only be obtained through adaptivity.

Published
2023

2. Convergence of Successive Linear Programming Algorithms for Noisy Functions

Author

Hansknecht, Christoph, Kirches, Christian, and Manns, Paul

Subjects
Mathematics - Optimization and Control, 65K05, 90C30
Abstract

Gradient-based methods have been highly successful for solving a variety of both unconstrained and constrained nonlinear optimization problems. In real-world applications, such as optimal control or machine learning, the necessary function and derivative information may be corrupted by noise, however. Sun and Nocedal have recently proposed a remedy for smooth unconstrained problems by means of a stabilization of the acceptance criterion for computed iterates, which leads to convergence of the iterates of a trust-region method to a region of criticality, Sun and Nocedal (2022). We extend their analysis to the successive linear programming algorithm, Byrd et al. (2023a,2023b), for unconstrained optimization problems with objectives that can be characterized as the composition of a polyhedral function with a smooth function, where the latter and its gradient may be corrupted by noise. This gives the flexibility to cover, for example, (sub)problems arising image reconstruction or constrained optimization algorithms. We provide computational examples that illustrate the findings and point to possible strategies for practical determination of the stabilization parameter that balances the size of the critical region with a relaxation of the acceptance criterion (or descent property) of the algorithm.

Published
2023

3. On Convergence of Binary Trust-Region Steepest Descent

Author

Manns, Paul, Hahn, Mirko, Kirches, Christian, Leyffer, Sven, and Sager, Sebastian

Subjects
Mathematics - Optimization and Control, 49J45, 49M05, 90C30
Abstract

Binary trust-region steepest descent (BTR) and combinatorial integral approximation (CIA) are two recently investigated approaches for the solution of optimization problems with distributed binary-/discrete-valued variables (control functions). We show improved convergence results for BTR by imposing a compactness assumption that is similar to the convergence theory of CIA. As a corollary we conclude that BTR also constitutes a descent algorithm on the continuous relaxation and its iterates converge weakly-$^*$ to stationary points of the latter. We provide computational results that validate our findings. In addition, we observe a regularizing effect of BTR, which we explore by means of a hybridization of CIA and BTR.

Published
2022
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4. A deterministic matching method for exact matchings to compare the outcome of different interventions

Author

Bestehorn, Felix, Bestehorn, Maike, and Kirches, Christian

Subjects
Statistics - Applications, 62D20, 91B68
Abstract

Statistical matching methods are widely used in the social and health sciences to estimate causal effects using observational data. Often the objective is to find comparable groups with similar covariate distributions in a dataset, with the aim to reduce bias in a random experiment. We aim to develop a foundation for deterministic methods which provide results with low bias, while retaining interpretability. The proposed method matches on the covariates and calculates all possible maximal exact matchesfor a given dataset without adding numerical errors. Notable advantages of our method over existing matching algorithms are that all available information for exact matches is used, no additional bias is introduced, it can be combined with other matching methods for inexact matching to reduce pruning and that the result is calculated in a fast and deterministic way. For a given dataset the result is therefore provably unique for exact matches in the mathematical sense. We provide proofs, instructions for implementation as well as a numerical example calculated for comparison on a complete survey.

Published
2021

5. Sequential Linearization Method for Bound-Constrained Mathematical Programs with Complementarity Constraints

Author

Kirches, Christian, Larson, Jeffrey, Leyffer, Sven, and Manns, Paul

Subjects
Mathematics - Optimization and Control
Abstract

We propose an algorithm for solving bound-constrained mathematical programs with complementarity constraints on the variables. Each iteration of the algorithm involves solving a linear program with complementarity constraints in order to obtain an estimate of the active set. The algorithm enforces descent on the objective function to promote global convergence to B-stationary points. We provide a convergence analysis and preliminary numerical results on a range of test problems. We also study the effect of fixing the active constraints in a bound-constrained quadratic program that can be solved on each iteration in order to obtain fast convergence., Comment: 33 pages

Published
2020
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6. Relations between Abs-Normal NLPs and MPCCs. Part 2: Weak Constraint Qualifications

Author

Hegerhorst-Schultchen, Lisa C., Kirches, Christian, and Steinbach, Marc C.

Subjects
Mathematics - Optimization and Control, 90C30, 90C33, 90C46
Abstract

This work continues an ongoing effort to compare non-smooth optimization problems in abs-normal form to Mathematical Programs with Complementarity Constraints (MPCCs). We study general Nonlinear Programs with equality and inequality constraints in abs-normal form, so-called Abs-Normal NLPs, and their relation to equivalent MPCC reformulations. We introduce the concepts of Abadie's and Guignard's kink qualification and prove relations to MPCC-ACQ and MPCC-GCQ for the counterpart MPCC formulations. Due to non-uniqueness of a specific slack reformulation suggested in [10], the relations are non-trivial. It turns out that constraint qualifications of Abadie type are preserved. We also prove the weaker result that equivalence of Guginard's (and Abadie's) constraint qualifications for all branch problems hold, while the question of GCQ preservation remains open. Finally, we introduce M-stationarity and B-stationarity concepts for abs-normal NLPs and prove first order optimality conditions corresponding to MPCC counterpart formulations.

Published
2020
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7. Relations between Abs-Normal NLPs and MPCCs. Part 1: Strong Constraint Qualifications

Author

Hegerhorst-Schultchen, Lisa C., Kirches, Christian, and Steinbach, Marc C.

Subjects
Mathematics - Optimization and Control, 90C30, 90C33, 90C46
Abstract

This work is part of an ongoing effort of comparing non-smooth optimization problems in abs-normal form to MPCCs. We study the general abs-normal NLP with equality and inequality constraints in relation to an equivalent MPCC reformulation. We show that kink qualifications and MPCC constraint qualifications of linear independence type and Mangasarian-Fromovitz type are equivalent. Then we consider strong stationarity concepts with first and second order optimality conditions, which again turn out to be equivalent for the two problem classes. Throughout we also consider specific slack reformulations suggested in [9], which preserve constraint qualifications of linear independence type but not of Mangasarian-Fromovitz type.

Published
2020
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9. A deterministic balancing score algorithm to avoid common pitfalls of propensity score matching

Author

Bestehorn, Felix, Bestehorn, Maike, Bestehorn, Markus, and Kirches, Christian

Subjects
Statistics - Applications, Statistics - Computation, Statistics - Methodology
Abstract

Propensity score matching (PSM) is the de-facto standard for estimating causal effects in observational studies. We show that PSM and its implementations are susceptible to several major drawbacks and illustrate these findings using a case study with $17,427$ patients. We derive four formal properties an optimal statistical matching algorithm should meet, and propose Deterministic Balancing Score exact Matching (DBSeM) which meets the aforementioned properties for an exact matching. Furthermore, we investigate one of the main problems of PSM, that is that common PSM results in one valid set of matched pairs or a bootstrapped PSM in a selection of possible valid sets of matched pairs. For exact matchings we provide the mathematical proof, that DBSeM, as a result, delivers the expected value of all valid sets of matched pairs for the investigated dataset., Comment: 25 pages, 3 tables

Published
2018

11. trlib: A vector-free implementation of the GLTR method for iterative solution of the trust region problem

Author

Lenders, Felix, Kirches, Christian, and Potschka, Andreas

Subjects
Mathematics - Optimization and Control, 35Q90, 65K05, 90C20, 90C30, 97N90
Abstract

We describe trlib, a library that implements a variant of Gould's Generalized Lanczos method (Gould et al. in SIAM J. Opt. 9(2), 504-525, 1999) for solving the trust region problem. Our implementation has several distinct features that set it apart from preexisting ones. We implement both conjugate gradient (CG) and Lanczos iterations for assembly of Krylov subspaces. A vector- and matrix-free reverse communication interface allows the use of most general data structures, such as those arising after discretization of function space problems. The hard case of the trust region problem frequently arises in sequential methods for nonlinear optimization. In this implementation, we made an effort to fully address the hard case in an exact way by considering all invariant Krylov subspaces. We investigate the numerical performance of trlib on the full subset of unconstrained problems of the CUTEst benchmark set. In addition to this, interfacing the PDE discretization toolkit FEniCS with trlib using the vector-free reverse communication interface is demonstrated for a family of PDE-constrained control trust region problems adapted from the OPTPDE collection.

Published
2016

12. Compactness and convergence rates in the combinatorial integral approximation decomposition

Author

Kirches, Christian, Manns, Paul, Ulbrich, Stefan, Kirches, Christian, Manns, Paul, and Ulbrich, Stefan

Abstract

The combinatorial integral approximation decomposition splits the optimization of a discrete-valued control into two steps: solving a continuous relaxation of the discrete control problem, and computing a discrete-valued approximation of the relaxed control. Different algorithms exist for the second step to construct piecewise constant discrete-valued approximants that are defined on given decompositions of the domain. It is known that the resulting discrete controls can be constructed such that they converge to a relaxed control in the weak* topology of L∞ if the grid constant of this decomposition is driven to zero. We exploit this insight to formulate a general approximation result for optimization problems, which feature discrete and distributed optimization variables, and which are governed by a compact control-to-state operator. We analyze the topology induced by the grid refinements and prove convergence rates of the control vectors for two problem classes. We use a reconstruction problem from signal processing to demonstrate both the applicability of the method outside the scope of differential equations, the predominant case in the literature, and the effectiveness of the approach.

Published
2024

21. Combining multi-level real-time iterations of Nonlinear Model Predictive Control to realize squatting motions on Leo

Author

Kudruss, Manuel, Koryakovskiy, I., Vallery, H., Mombaur, Katja, and Kirches, Christian

Subjects
multi-level real-time iterations, robotics, optimal control, nonlinear model predictive control, real-time, humanoid robots
Abstract

Today’s humanoid robots are complex mechanical systems with many degrees of freedom that are built to achieve locomotion skills comparable to humans. In order to synthesize whole-body motions, real-tme capable direct methods of optimal control are a subject of contemporary research. To this end, Nonlinear Model Predictive Control is the method of choice to realize motions on the physical robot using model-based optimal control. However, the complexity of the problem results in a high computational time that falls short of the expectations of robotic experimenters and control engineers. In this article, we show how advanced NMPC methods can be applied to improve the control rate by a factor of 10–16 up to 190Hz. This is achieved by thread-based parallelization of two controllers and by efficiently reusing control problem linearizations of the last iteration to provide fast feedback by one controller while the other controller prepares the next nonlinear step including the evaluation of the multi-body dynamics and the respective sensitivities. This way, the bottleneck of the roll-out of up to 130 ms can partly be side-stepped by repeated calls of the much faster feedback phase of ~5ms. This enables a realization of a squatting task on the actual 2D-robot Leo of Delft University of Technology, which was not possible using a conventional Nonlinear Model Predictive Control scheme.

Published
2018

23. Combining multi-level real-time iterations of Nonlinear Model Predictive Control to realize squatting motions on Leo

Author

Kudruss, Manuel (author), Koryakovskiy, I. (author), Vallery, H. (author), Mombaur, Katja (author), Kirches, Christian (author), Kudruss, Manuel (author), Koryakovskiy, I. (author), Vallery, H. (author), Mombaur, Katja (author), and Kirches, Christian (author)

Abstract

Today’s humanoid robots are complex mechanical systems with many degrees of freedom that are built to achieve locomotion skills comparable to humans. In order to synthesize whole-body motions, real-tme capable direct methods of optimal control are a subject of contemporary research. To this end, Nonlinear Model Predictive Control is the method of choice to realize motions on the physical robot using model-based optimal control. However, the complexity of the problem results in a high computational time that falls short of the expectations of robotic experimenters and control engineers. In this article, we show how advanced NMPC methods can be applied to improve the control rate by a factor of 10–16 up to 190Hz. This is achieved by thread-based parallelization of two controllers and by efficiently reusing control problem linearizations of the last iteration to provide fast feedback by one controller while the other controller prepares the next nonlinear step including the evaluation of the multi-body dynamics and the respective sensitivities. This way, the bottleneck of the roll-out of up to 130 ms can partly be side-stepped by repeated calls of the much faster feedback phase of ~5ms. This enables a realization of a squatting task on the actual 2D-robot Leo of Delft University of Technology, which was not possible using a conventional Nonlinear Model Predictive Control scheme., Biomechatronics & Human-Machine Control

Published
2018

24. Benchmarking model-free and model-based optimal control

Author

Koryakovskiy, I. (author), Kudruss, M. (author), Babuska, R. (author), Caarls, W. (author), Kirches, Christian (author), Mombaur, Katja (author), Schlöder, Johannes P. (author), Vallery, H. (author), Koryakovskiy, I. (author), Kudruss, M. (author), Babuska, R. (author), Caarls, W. (author), Kirches, Christian (author), Mombaur, Katja (author), Schlöder, Johannes P. (author), and Vallery, H. (author)

Abstract

Model-free reinforcement learning and nonlinear model predictive control are two different approaches for controlling a dynamic system in an optimal way according to a prescribed cost function. Reinforcement learning acquires a control policy through exploratory interaction with the system, while nonlinear model predictive control exploits an explicitly given mathematical model of the system. In this article, we provide a comprehensive comparison of the performance of reinforcement learning and nonlinear model predictive control for an ideal system as well as for a system with parametric and structural uncertainties. The comparison is based on two different criteria, namely the similarity of trajectories and the resulting rewards. The evaluation of both methods is performed on a standard benchmark problem: a cart–pendulum swing-up and balance task. We first find suitable mathematical formulations and discuss the effect of the differences in the problem formulations. Then, we investigate the robustness of reinforcement learning and nonlinear model predictive control against uncertainties. The results demonstrate that nonlinear model predictive control has advantages over reinforcement learning if uncertainties can be eliminated through identification of the system parameters. Otherwise, there exists a break-even point after which model-free reinforcement learning performs better than nonlinear model predictive control with an inaccurate model. These findings suggest that benefits can be obtained by combining these methods for real systems being subject to such uncertainties. In the future, we plan to develop a hybrid controller and evaluate its performance on a real seven-degree-of-freedom walking robot., Accepted Author Manuscript, Biomechatronics & Human-Machine Control, Learning & Autonomous Control

Published
2017
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26. Kombinatorische Algorithmen und Komplexität von Rundungsproblemen bei gemischt-ganzzahligen Optimalsteuerungsproblemen

Author

Bestehorn, Felix, Kirches, Christian, and Sager, Sebastian

Subjects
doctoral thesis, ddc:511, ddc:51, ddc:5
Abstract

The combinatorial decomposition approach, consisting of first solving a (nonlinear) relaxed problem and then computing appropriate roundings recuperating the discrete controls, has become an established method for solving mixed-integer optimal control problems. This thesis analyzes the rounding step in detail, provides a time complexity investigation, and develops three new fast non-heuristical approaches for the rounding step, enhancing the modeling capabilities of the decomposition approach. In particular, the proposed algorithms can be used to solve rounding problems in the presence of combinatorial constraints or switching costs up to optimality with respect to a wide range of objective functions, e.g., the integral control deviation or the switching costs. The first approach is concerned with rounding problems on equidistant grids and vanishing constraints. We establish a connection between assigning discrete controls to grid points in the discretization and computing a matching on a simple bipartite graph. Using the graph-based view, we provide the tight bound for the integral control deviation and develop a fast rounding algorithm for this setting, which solves the rounding problem optimally in polynomial time. For the second approach, we reformulate the rounding problem into a system of linear algebraic equations modulo 2. Application of this formulation allows several combinatorial constraints such as dwell times to be added to the rounding step. We generalize the dwell-time setting and provide additional combinatorial constraint formulations enhancing the modeling capabilities of the decomposition approach. Finally, we show that the rounding problem becomes NP-complete when switching costs are added that directly depend on the rounding decision made for the previous grid point. For this setting, we develop a rounding framework based on computing a shortest path in a directed acyclic graph. This framework is capable of quickly computing the discrete control with minimal switching costs within a maximally allowed integral deviation. The framework also provides the additional flexibility to solve all of the previously discussed combinatorially constrained rounding problems and can be applied to optimal control problems in the multidimensional setting. Numerical experiments on several benchmark problems illustrate and support the theoretical findings., Die combinatorial integral approximation Zerlegung hat sich in den letzten Jahren als ein Verfahren zur Lösung beziehungsweise Approximation von gemischt-ganzzahligen Optimalsteuerungsproblemen etabliert. Bei diesem Verfahren wird zunächst ein relaxiertes (nichtlineares) Problem gelöst. Durch Anwendung eines geeigneten Rundungsalgorithmus wird aus der relaxierten Lösung eine ganzzahlige Steuerung für das ursprüngliche gemischt-ganzzahlige Problem generiert. Diese Arbeit erweitert sowohl die theoretischen als auch die praktischen Anwendungsmöglichkeiten des Verfahrens, indem sie den Rundungsschritt im Detail analysiert und drei schnelle neue nicht-heuristische Algorithmen entwickelt. Insbesondere ermöglichen diese Algorithmen, Rundungsprobleme mit kombinatorischen Nebenbedingungen oder Schaltkosten optimal im Bezug auf die gewählte Kostenfunktion, wie beispielsweise der maximal zulässigen Abweichung zur relaxierten Lösung (integral control deviation) oder den Schaltkosten, zu lösen. Der erste Ansatz erlaubt es, Rundungsprobleme auf äquidistanten Gittern und mit vanishing constraints in Polynomialzeit zu lösen. Wir ermöglichen dies, indem wir das Rundungsproblem als ein Zuweisungsproblem (assignment problem) auffassen. Die mathematische Sichtweise entspricht in diesem Fall dem matching problem auf einem einfachen bipartiten Graphen, welcher durch Kontrollaktivierungen und Gitterpunkte modelliert ist. Dieser graphenbasierte Ansatz gewährt zudem die Möglichkeit, die bestmögliche Schranke der integral control deviation für vanishing constraint behaftete Rundungsprobleme herzuleiten. In einem zweiten Ansatz reformulieren wir das Rundungsproblem in ein linear-algebraisches Gleichungssystem modulo 2. Diese Betrachtungsweise gestattet es, verschiedene kombinatorische Nebenbedingungen wie unter anderem Verweilzeiten (dwell-times) in den Rundungsschritt mitaufzunehmen. Zudem verallgemeinern wir die Formulierung der Verweilzeitnebenbedingungen und legen dar, wie zusätzliche kombinatorische Nebenbedingungen in den Rundungsschritt aufgenommen werden können. Dies erweitert die Modellierungsmöglichkeiten des gesamten Zerlegungsanssatzes. Ein dritter Ansatz wird für Rundungsprobleme mit Schaltkosten benötigt. Wir zeigen, dass dieses Problem bereits für Schaltkosten, deren Höhe unmittelbar von der Rundungsentscheidung auf dem vorherigen Gitterpunkt abhängt, NP-vollständig ist. Um diese insbesondere für die Praxis wichtige Problemklasse von Rundungsproblemen dennoch handhaben zu können, wird ein Ansatz basierend auf einer kürzesten Wege Formulierung in azyklischen gerichteten Graphen entwickelt. Dieser Ansatz ermöglicht es, zuverlässig und schnell diskrete Steuerungen mit minimalen Schaltkosten innerhalb einer vorgegebenen integral control deviation zu berechnen. Des Weiteren ist der kürzeste Wege Ansatz im Vergleich zu den anderen in dieser Arbeit entwickelten Algorithmen der flexibelste hinsichtlich zusätzlicher kombinatorischer Nebenbedingungen, da er nicht nur jegliche der zuvor diskutieren Rundungsprobleme lösen kann, sondern auch bei mehrdimensionalen Optimalsteuerungsproblemen einsetzbar ist. Abschließend werden die theoretischen Ergebnisse durch numerische Berechnungen bestätigt und veranschaulicht.

Published
2022

27. An elastic primal active-set method for structured QPs

Author

Rose, Daniel, Steinbach, Marc C., Kirches, Christian, and Wick, Thomas

Subjects
Relaxierung, Aktive Mengen Methode, slack relaxation, sequentielle quadratische Programmierung, quadratic programming, infeasible warm start, penalty formulation, Warmstart, nonlinear optimization, Dewey Decimal Classification::500 | Naturwissenschaften::510 | Mathematik, Active-set methods, nichtlineare Optimierung, quadratische Programme, Straffunktionen, ddc:510, sequential quadratic programming
Abstract

[no abstract]

Published
2018
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