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1. Approximation algorithms for the joint replenishment problem with deadlines

Author

Bienkowski, M, Byrka, J, Chrobak, M, Dobbs, N, Nowicki, T, Sviridenko, M, Świrszcz, G, and Young, NE

Subjects
Joint replenishment problem, NP-completeness, APX-hardness, Approximation algorithms, cs.DS, 68W25, 90C05, G.1.6, 68W25, 90C05, Operations Research, Applied Mathematics, Numerical and Computational Mathematics, Business and Management
Abstract

The Joint Replenishment Problem ($${\hbox {JRP}}$$JRP) is a fundamental optimization problem in supply-chain management, concerned with optimizing the flow of goods from a supplier to retailers. Over time, in response to demands at the retailers, the supplier ships orders, via a warehouse, to the retailers. The objective is to schedule these orders to minimize the sum of ordering costs and retailers’ waiting costs. We study the approximability of $${\hbox {JRP-D}}$$JRP-D, the version of $${\hbox {JRP}}$$JRP with deadlines, where instead of waiting costs the retailers impose strict deadlines. We study the integrality gap of the standard linear-program (LP) relaxation, giving a lower bound of $$1.207$$1.207, a stronger, computer-assisted lower bound of $$1.245$$1.245, as well as an upper bound and approximation ratio of $$1.574$$1.574. The best previous upper bound and approximation ratio was $$1.667$$1.667; no lower bound was previously published. For the special case when all demand periods are of equal length, we give an upper bound of $$1.5$$1.5, a lower bound of $$1.2$$1.2, and show APX-hardness.

Published
2015

2. Approximation algorithms for the joint replenishment problem with deadlines

Author

Bienkowski, M, Byrka, J, Chrobak, M, Dobbs, N, Nowicki, T, Sviridenko, M, Świrszcz, G, and Young, NE

Subjects
Applied Mathematics, Numerical and Computational Mathematics, Business and Management, Operations Research
Abstract

The Joint Replenishment Problem ((Formula presented.)) is a fundamental optimization problem in supply-chain management, concerned with optimizing the flow of goods from a supplier to retailers. Over time, in response to demands at the retailers, the supplier ships orders, via a warehouse, to the retailers. The objective is to schedule these orders to minimize the sum of ordering costs and retailers' waiting costs. We study the approximability of (Formula presented.), the version of (Formula presented.) with deadlines, where instead of waiting costs the retailers impose strict deadlines. We study the integrality gap of the standard linear-program (LP) relaxation, giving a lower bound of (Formula presented.), a stronger, computer-assisted lower bound of (Formula presented.), as well as an upper bound and approximation ratio of (Formula presented.). The best previous upper bound and approximation ratio was (Formula presented.); no lower bound was previously published. For the special case when all demand periods are of equal length, we give an upper bound of (Formula presented.), a lower bound of (Formula presented.), and show APX-hardness. © 2014 Springer Science+Business Media New York.

Published
2014

3. Breaching the 2-Approximation Barrier for Connectivity Augmentation: A Reduction to Steiner Tree

Author

Byrka, J., Grandoni, Fabrizio, Jabal Ameli, Afrouz, Byrka, J., Grandoni, Fabrizio, and Jabal Ameli, Afrouz

Abstract

The basic goal of survivable network design is to build a cheap network that maintains the connectivity between given sets of nodes despite the failure of a few edges/nodes. The connectivity augmentation problem (CAP) is arguably one of the most basic problems in this area: given a k(-edge)-connected graph G and a set of extra edges (links), select a minimum cardinality subset A of links such that adding A to G increases its edge connectivity to k+1. Intuitively, one wants to make an existing network more reliable by augmenting it with extra edges. The best known approximation factor for this NP-hard problem is 2, and this can be achieved with multiple approaches (the first such result is in [G. N. Frederickson and J\'aj\' a, SIAM J. Comput., 10 (1981), pp. 270-283]. It is known [E. A. Dinitz, A. V. Karzanov, and M. V. Lomonosov, Studies in Discrete Optimization, Nauka, Moscow, 1976, pp. 290-306] that CAP can be reduced to the case k = 1, also known as the tree augmentation problem (TAP) for odd k, and to the case k = 2, also known as the cactus augmentation problem (CacAP) for even k. Prior to the conference version of this paper [J. Byrka, F. Grandoni, and A. Jabal Ameli, STOC'20, ACM, New York, 2020, pp. 815-825], several better than 2 approximation algorithms were known for TAP, culminating with a recent 1.458 approximation [F. Grandoni, C. Kalaitzis, and R. Zenklusen, STOC'18, ACM, New York, 1918, pp. 632-645]. However, for CacAP the best known approximation was 2. In this paper we breach the 2 approximation barrier for CacAP, hence, for CAP, by presenting a polynomial-time 2 ln(4) - 1120 967 + \varepsilon < 1.91 approximation. From a technical point of view, our approach deviates quite substantially from previous work. In particular, the better-than-2 approximation algorithms for TAP either exploit greedy-style algorithms or are based on rounding carefully designed LPs. We instead use a reduction to the Steiner tree problem which wa

Published
2023

4. Unbounded lower bound for k-server against weak adversaries

Author

Bienkowski, M. (Marcin), Byrka, J. (Jaroslaw), Coester, C.E. (Christian), Jeż, L. (Łukasz), Bienkowski, M. (Marcin), Byrka, J. (Jaroslaw), Coester, C.E. (Christian), and Jeż, L. (Łukasz)

Abstract

We study the resource augmented version of the k-server problem, also known as the k-server problem against weak adversaries or the (h,k)-server problem. In this setting, an online algorithm using k servers is compared to an offline algorithm using h servers, where h ≤ k. For uniform metrics, it has been known since the seminal work of Sleator and Tarjan (1985) that for any ">0, the competitive ratio drops to a constant if k=(1+") · h. This result was later generalized to weighted stars (Young 1994) and trees of bounded depth (Bansal et al. 2017). The main open problem for this setting is whether a similar phenomenon occurs on general metrics. We resolve this question negatively. With a simple recursive construction, we show that the competitive ratio is at least ω(loglogh), even as k→∞. Our lower bound holds for both deterministic and randomized algorithms. It also disproves the existence of a competitive algorithm for the infinite server problem on general metrics.

Published
2020
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5. Better Bounds for Online Line Chasing

Author

Bienkowski, M, Byrka, J, Chrobak, M, Coester, C, Jeż, Ł, and Koutsoupias, E

Subjects
FOS: Computer and information sciences, 000 Computer science, knowledge, general works, Computer Science - Data Structures and Algorithms, Computer Science, Data Structures and Algorithms (cs.DS)
Abstract

We study online competitive algorithms for the line chasing problem in Euclidean spaces Rd, where the input consists of an initial point P0 and a sequence of lines X1,X2,...,Xm, revealed one at a time. At each step t, when the line Xt is revealed, the algorithm must determine a point Pt ∈ Xt. An online algorithm is called c-competitive if for any input sequence the path P0, P1, ..., Pm it computes has length at most c times the optimum path. The line chasing problem is a variant of a more general convex body chasing problem, where the sets Xt are arbitrary convex sets. To date, the best competitive ratio for the line chasing problem was 28.1, even in the plane. We improve this bound by providing a simple 3-competitive algorithm for any dimension d. We complement this bound by a matching lower bound for algorithms that are memoryless in the sense of our algorithm, and a lower bound of 1.5358 for arbitrary algorithms. The latter bound also improves upon the previous lower bound of √2 ≈ 1.412 for convex body chasing in 2 dimensions.

Published
2019
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7. Bi-Factor Approximation Algorithms for Hard Capacitated $k$-Median Problems

Author

Byrka, J., Fleszar, K., Rybicki, B., and Joachim Spoerhase

Subjects
FOS: Computer and information sciences, Computer Science - Data Structures and Algorithms, Data Structures and Algorithms (cs.DS), 68-02 68-06 05C21 05C40 68R10 68W05 68W20 68W25 68W40 68Q25 68Q87 90B80 90C05 90C10 90C27 90C35 90C46 90C49 90C59
Abstract

The $k$-Facility Location problem is a generalization of the classical problems $k$-Median and Facility Location. The goal is to select a subset of at most $k$ facilities that minimizes the total cost of opened facilities and established connections between clients and opened facilities. We consider the hard-capacitated version of the problem, where a single facility may only serve a limited number of clients and creating multiple copies of a facility is not allowed. We construct approximation algorithms slightly violating the capacities based on rounding a fractional solution to the standard LP. It is well known that the standard LP (even in the case of uniform capacities and opening costs) has unbounded integrality gap if we only allow violating capacities by a factor smaller than $2$, or if we only allow violating the number of facilities by a factor smaller than $2$. In this paper, we present the first constant-factor approximation algorithms for the hard-capacitated variants of the problem. For uniform capacities, we obtain a $(2+\varepsilon)$-capacity violating algorithm with approximation ratio $O(1/\varepsilon^2)$; our result has not yet been improved. Then, for non-uniform capacities, we consider the case of $k$-Median, which is equivalent to $k$-Facility Location with uniform opening cost of the facilities. Here, we obtain a $(3+\varepsilon)$-capacity violating algorithm with approximation ratio $O(1/\varepsilon)$., Comment: Inaccuracies from the previous version have been addressed. Extended argument was the basis for a chapter of the PhD thesis of Krzysztof Fleszar

Published
2013
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8. New results on optimizing rooted triplets consistency

Author

Byrka, J., Guillemot, S., Jansson, J., Hong, S.H., Nagamochi, H., Fukunaga, T., Stochastic Operations Research, Combinatorial Optimization 1, Networks and Optimization, Sequential Learning (SEQUOIA), Laboratoire d'Informatique Fondamentale de Lille (LIFL), Université de Lille, Sciences et Technologies-Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lille, Sciences Humaines et Sociales-Centre National de la Recherche Scientifique (CNRS)-Université de Lille, Sciences et Technologies-Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lille, Sciences Humaines et Sociales-Centre National de la Recherche Scientifique (CNRS)-Inria Lille - Nord Europe, Institut National de Recherche en Informatique et en Automatique (Inria), Université de Lille, Sciences et Technologies-Institut National de Recherche en Informatique et en Automatique (Inria)-Université de Lille, Sciences Humaines et Sociales-Centre National de la Recherche Scientifique (CNRS), Hong, Seok-Hee, Nagamochi, Hiroshi, and Fukunaga, Takuro

Subjects
Optimization problem, Pseudorandomness, Hardness of approximation, Supertree, Combinatorics, Set (abstract data type), Tree (descriptive set theory), Cardinality, Consistency (statistics), Simple (abstract algebra), Discrete Mathematics and Combinatorics, Fraction (mathematics), Approximation, Time complexity, ComputingMilieux_MISCELLANEOUS, Mathematics, Discrete mathematics, Binary tree, Applied Mathematics, Rooted triplet, triplet consistency, Computational Biology, Approximation algorithm, Phylogenetic tree
Abstract

A set of phylogenetic trees with overlapping leaf sets is consistent if it can be merged without conflicts into a supertree. In this paper, we study the polynomial-time approximability of two related optimization problems called the maximum rooted triplets consistency problem ($\textsc{MaxRTC}$) and the minimum rooted triplets inconsistency problem ($\textsc{MinRTI}$) in which the input is a set $\mathcal{R}$ of rooted triplets, and where the objectives are to find a largest cardinality subset of $\mathcal{R}$ which is consistent and a smallest cardinality subset of $\mathcal{R}$ whose removal from $\mathcal{R}$ results in a consistent set, respectively. We first show that a simple modification to Wu’s Best-Pair-Merge-First heuristic [25] results in a bottom-up-based 3-approximation for $\textsc{MaxRTC}$. We then demonstrate how any approximation algorithm for $\textsc{MinRTI}$ could be used to approximate $\textsc{MaxRTC}$, and thus obtain the first polynomial-time approximation algorithm for $\textsc{MaxRTC}$ with approximation ratio smaller than 3. Next, we prove that for a set of rooted triplets generated under a uniform random model, the maximum fraction of triplets which can be consistent with any tree is approximately one third, and then provide a deterministic construction of a triplet set having a similar property which is subsequently used to prove that both $\textsc{MaxRTC}$ and $\textsc{MinRTI}$ are NP-hard even if restricted to minimally dense instances. Finally, we prove that $\textsc{MinRTI}$ cannot be approximated within a ratio of Ω(logn) in polynomial time, unless P = NP.

Published
2010

9. Drawing (complete) binary tanglegrams: hardness, approximation, fixed-parameter tractability

Author

Buchin, K., Buchin, M., Byrka, J., Nöllenburg, M., Okamoto, Y., Silveira, R.I., Wolff, A., Tollis, I.G., Patrignani, M., Stochastic Operations Research, Algorithms, and Combinatorial Optimization 1

Abstract

A binary tanglegram is a pair of binary trees whose leaf sets are in one-to-one correspondence; matching leaves are connected by inter-tree edges. For applications, for example in phylogenetics, it is essential that both trees are drawn without edge crossings and that the inter-tree edges have as few crossings as possible. It is known that finding a drawing with the minimum number of crossings is NP-hard and that the problem is fixed-parameter tractable with respect to that number. We prove that under the Unique Games Conjecture there is no constant-factor approximation for general binary trees. We show that the problem is hard even if both trees are complete binary trees. For this case we give an O(n 3)-time 2-approximation and a new and simple fixed-parameter algorithm. We show that the maximization version of the dual problem for general binary trees can be reduced to a version of MaxCut for which the algorithm of Goemans and Williamson yields a 0.878-approximation.

Published
2009

10. Randomized approximation algorithms : facility location, phylogenetic networks, Nash equilibria

Author

Byrka, J., Aardal, Karen I., de Berg, Mark T., and Algorithms

Abstract

Despite a great effort, researchers are unable to find efficient algorithms for a number of natural computational problems. Typically, it is possible to emphasize the hardness of such problems by proving that they are at least as hard as a number of other problems. In the language of computational complexity it means proving that the problem is complete for a certain class of problems. For optimization problems, we may consider to relax the requirement of the outcome to be optimal and accept an approximate (i.e., close to optimal) solution. For many of the problems that are hard to solve optimally, it is actually possible to efficiently find close to optimal solutions. In this thesis, we study algorithms for computing such approximate solutions.

Published
2008

11. An optimal bifactor approximation algorithm for the metric uncapacitated facility location problem

Author

Byrka, J., Charikar, M., Jansen, K., Reingold, O., Rolim, J.D.P., Networks and Optimization, and Algorithms

Abstract

We consider the metric uncapacitated facility location problem(UFL). In this paper we modify the (1¿+¿2/e)-approximation algorithm of Chudak and Shmoys to obtain a new (1.6774,1.3738)- approximation algorithm for the UFL problem. Our linear programing rounding algorithm is the first one that touches the approximability limit curve established by Jain et al. As a consequence, we obtain the first optimal approximation algorithm for instances dominated by connection costs. Our new algorithm - when combined with a (1.11,1.7764)-approxima- tion algorithm proposed by Jain, Mahdian and Saberi, and later analyzed by Mahdian, Ye and Zhang - gives a 1.5-approximation algorithm for the metric UFL problem. This algorithm improves over the previously best known 1.52-approximation algorithm by Mahdian, Ye and Zhang, and it cuts the gap with the approximability lower bound by 1/3. The algorithm is also used to improve the approximation ratio for the 3-level version of the problem.

Published
2007

12. Cabin crew rostering at KLM: optimization of reserves

Author

Bijvank, M., Byrka, J., van Heijster, P., Gnedin, A.V., Olejniczak, T., Swist, T., Zyprych, J., Bisseling, R.H., Mulder, J., Paelinck, M., de Ridder, H., Dajani, K., Dijkema, T.J., van de Leur, J.W., Zegeling, P.A., Analyse, Stochastiek, and Dep Wiskunde

Subjects
Landbouwwetenschappen, algemeen [Wiskunde], Natuurwetenschappen, Wiskunde en computerwetenschappen, Mathematics
Abstract

In this paper, we will discuss the issue of rostering jobs of cabin crew attendants at KLM.Generated schedules get easily disrupted by events such as illness of an employee. Obviously, reservepeople have to be kept ‘on duty’ to resolve such disruptions. A lot of reserve crew requiresmore employees, but too few results in so-called secondary disruptions, which are particularlyinconvenient for both the crew members and the planners. In this research we will discuss severalmodifications of the reserve scheduling policy that have a potential to reduce the number of secondarydisruptions, and therefore to improve the performance of the scheduling process.

Published
2007

13. Partitioning a Call Graph

Author

Bisseling, R.H., Byrka, J., Cerav-Erbas, S., Gvozdenovic, N., Lorenz, M., Pendavingh, R., Reeves, C., Roger, M., Verhoeven, A., van den Berg, J.B., Bhulai, S., Hulshof, J., Koole, G., Quant, C., Williams, J.F., Analyse, and Dep Wiskunde

Subjects
Landbouwwetenschappen, Wiskunde: algemeen, Taverne, Wiskunde en computerwetenschappen, Mathematics
Abstract

Splitting a large software system into smaller and more manageable units has become an important problem for many organizations. The basic structure of a software system is given by a directed graph with vertices representing the programs of the system and arcs representing calls from one program to another. Generating a good partitioning into smaller modules becomes a minimization problem for the number of programs being called by external programs. First, we formulate an equivalent integer linear programming problem with 0–1 variables. Theoretically, with this approach the problem can be solved to optimality, but this becomes very costly with increasing size of the software system. Second, we formulate the problem as a hypergraph partitioning problem. This is a heuristic method using a multilevel strategy, but it turns out to be very fast and to deliver solutions that are close to optimal.

Published
2006

14. Bucket Game with Applications to Set Multicover and Dynamic Page Migration

Author

Bienkowski, M., Byrka, J., Stølting Brodal, Gerth, Leonardi, Stefano, and Networks and Optimization

Subjects
Set (abstract data type), Theoretical computer science, Cover (topology), Competitive analysis, Computer science, Generalization, Approximation algorithm, Set cover problem, Online algorithm, Algorithm, Randomized algorithm
Abstract

We present a simple two-person Bucket Game, based on throwing balls into buckets, and we discuss possible players’ strategies. We use these strategies to create an approximation algorithm for a generalization of the well known Set Cover problem, where we need to cover each element by at least k sets. Furthermore, we apply these strategies to construct a randomized algorithm for Dynamic Page Migration problem achieving the optimal competitive ratio against an oblivious adversary.

Published
2005

15. Drawing (complete) binary tanglegrams: hardness, approximation, fixed-parameter tractability

Author

Buchin, K., Buchin, M., Byrka, J., Nöllenburg, M., Okamoto, Y., Silveira, R.I., Wolff, A., Buchin, K., Buchin, M., Byrka, J., Nöllenburg, M., Okamoto, Y., Silveira, R.I., and Wolff, A.

Abstract

A binary tanglegram is a drawing of a pair of rooted binary trees whose leaf sets are in one-to-one correspondence; matching leaves are connected by inter-tree edges. For applications, for example, in phylogenetics, it is essential that both trees are drawn without edge crossings and that the inter-tree edges have as few crossings as possible. It is known that finding a tanglegram with the minimum number of crossings is NP-hard and that the problem is fixed-parameter tractable with respect to that number. We prove that under the Unique Games Conjecture there is no constant-factor approximation for binary trees. We show that the problem is NP-hard even if both trees are complete binary trees. For this case we give an O(n^3)-time 2-approximation and a new, simple fixed-parameter algorithm. We show that the maximization version of the dual problem for binary trees can be reduced to a version of MaxCut for which the algorithm of Goemans and Williamson yields a 0.878-approximation. Keywords: Binary tanglegram – Crossing minimization – NP-hardness – Approximation algorithm – Fixed-parameter tractability

Published
2012

16. An Optimal Bifactor Approximation Algorithm for the Metric Uncapacitated Facility Location Problem

Author

Byrka, J. (Jaroslaw), Aardal, K. (Karen), Byrka, J. (Jaroslaw), and Aardal, K. (Karen)

Abstract

We obtain a 1.5-approximation algorithm for the metric uncapacitated facility location (UFL) problem, which improves on the previously best known 1.52-approximation algorithm by Mahdian, Ye, and Zhang. Note that the approximability lower bound by Guha and Khuller is $1.463\dots$. An algorithm is a ($\lambda_f$,$\lambda_c$)-approximation algorithm if the solution it produces has total cost at most $\lambda_f\cdot F^*+\lambda_c\cdot C^*$, where $F^*$ and $C^*$ are the facility and the connection cost of an optimal solution. Our new algorithm, which is a modification of the $(1+2/e)$-approximation algorithm of Chudak and Shmoys, is a $(1.6774,1.3738)$-approximation algorithm for the UFL problem and is the first one that touches the approximability limit curve $(\gamma_f,1+2e^{-\gamma_f})$ established by Jain, Mahdian, and Saberi. As a consequence, we obtain the first optimal approximation algorithm for instances dominated by connection costs. When combined with a $(1.11,1.7764)$-approximation algorithm proposed by Jain et al., and later analyzed by Mahdian et al., we obtain the overall approximation guarantee of 1.5 for the metric UFL problem. We also describe how to use our algorithm to improve the approximation ratio for the 3-level version of UFL.

Published
2010

17. Drawing (Complete) Binary Tanglegrams: Hardness, Approximation, Fixed-Parameter Tractability

Author

Byrka, J. (Jaroslaw), Buchin, K., Buchin, M., Nollenburg, M., Okamoto, Y., Silveira, R.I., Wolff, A., Byrka, J. (Jaroslaw), Buchin, K., Buchin, M., Nollenburg, M., Okamoto, Y., Silveira, R.I., and Wolff, A.

Abstract

A \emph{binary tanglegram} is a pair $$ of binary trees whose leaf sets are in one-to-one correspondence; matching leaves are connected by inter-tree edges. For applications, for example in phylogenetics, it is essential that both trees are drawn without edge crossing and that the inter-tree edges have as few crossings as possible. It is known that finding a drawing with the minimum number of crossings is NP-hard and that the problem is fixed-parameter tractable with respect to that number. We prove that under the Unique Games Conjecture there is no constant-factor approximation for general binary trees. We show that the problem is hard even if both trees are complete binary trees. For this case we give an $O(n^3)$-time 2-approximation and a new and simple fixed-parameter algorithm. We show that the maximization version of the dual problem for general binary trees can be reduced to a version of \textsc{MaxCut} for which the algorithm of Goemans and Williamson yields a 0.878-approximation.

Published
2010

18. An Optimal Bifactor Approximation Algorithm for the Metric Uncapacitated Facility Location Problem

Author

Byrka, J. (author), Aardal, K.I. (author), Byrka, J. (author), and Aardal, K.I. (author)

Abstract

We obtain a 1.5-approximation algorithm for the metric uncapacitated facility location (UFL) problem, which improves on the previously best known 1.52-approximation algorithm by Mahdian, Ye, and Zhang. Note that the approximability lower bound by Guha and Khuller is 1.463 . . . . An algorithm is a (?f ,?c)-approximation algorithm if the solution it produces has total cost at most ?f ·F?+?c ·C?, where F? and C? are the facility and the connection cost of an optimal solution. Our new algorithm, which is a modification of the (1 + 2/e)-approximation algorithm of Chudak and Shmoys, is a (1.6774, 1.3738)-approximation algorithm for the UFL problem and is the first one that touches the approximability limit curve (?f ,1+2e??f ) established by Jain, Mahdian, and Saberi. As a consequence, we obtain the first optimal approximation algorithm for instances dominated by connection costs. When combined with a (1.11, 1.7764)-approximation algorithm proposed by Jain et al., and later analyzed by Mahdian et al., we obtain the overall approximation guarantee of 1.5 for the metric UFL problem. We also describe how to use our algorithm to improve the approximation ratio for the 3-level version of UFL., Delft Institute of Applied Mathematics, Electrical Engineering, Mathematics and Computer Science

Published
2010
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19. Worst-case optimal approximation algorithms for maximizing triplet consistency within phylogenetic networks

Author

Byrka, J. (Jaroslaw), Huber, K.T., Kelk, S.M. (Steven), Gawrychowski, P. (Paweł), Byrka, J. (Jaroslaw), Huber, K.T., Kelk, S.M. (Steven), and Gawrychowski, P. (Paweł)

Abstract

The study of phylogenetic networks is of great interest to computational evolutionary biology and numerous different types of such structures are known. This article addresses the following question concerning rooted versions of phylogenetic networks. What is the maximum value of pset membership, variant[0,1] such that for every input set T of rooted triplets, there exists some network View the MathML source such that at least p|T| of the triplets are consistent with View the MathML source? We call an algorithm that computes such a network (where p is maximum) worst-case optimal. Here we prove that the set containing all triplets (the full triplet set) in some sense defines p. Moreover, given a network View the MathML source that obtains a fraction p′ for the full triplet set (for any p′), we show how to efficiently modify View the MathML source to obtain a fraction greater-or-equal, slantedp′ for any given triplet set T. We demonstrate the power of this insight by presenting a worst-case optimal result for level-1 phylogenetic networks improving considerably upon the 5/12 fraction obtained recently by Jansson, Nguyen and Sung. For level-2 phylogenetic networks we show that pgreater-or-equal, slanted0.61. We emphasize that, because we are taking |T| as a (trivial) upper bound on the size of an optimal solution for each specific input T, the results in this article do not exclude the existence of approximation algorithms that achieve approximation ratio better than p. Finally, we note that all the results in this article also apply to weighted triplet sets.

Published
2009

20. New Results on Optimizing Rooted Triplets Consistency

Author

Byrka, J. (Jaroslaw), Guillemot, S., Jansson, J., Byrka, J. (Jaroslaw), Guillemot, S., and Jansson, J.

Abstract

A set of phylogenetic trees with overlapping leaf sets is consistent if it can be merged without conflicts into a supertree. In this paper, we study the polynomial-time approximability of two related optimization problems called the maximum rooted triplets consistency problem ($\textsc{MaxRTC}$) and the minimum rooted triplets inconsistency problem ($\textsc{MinRTI}$) in which the input is a set $\mathcal{R}$ of rooted triplets, and where the objectives are to find a largest cardinality subset of $\mathcal{R}$ which is consistent and a smallest cardinality subset of $\mathcal{R}$ whose removal from $\mathcal{R}$ results in a consistent set, respectively. We first show that a simple modification to Wu’s Best-Pair-Merge-First heuristic [25] results in a bottom-up-based 3-approximation for $\textsc{MaxRTC}$. We then demonstrate how any approximation algorithm for $\textsc{MinRTI}$ could be used to approximate $\textsc{MaxRTC}$, and thus obtain the first polynomial-time approximation algorithm for $\textsc{MaxRTC}$ with approximation ratio smaller than 3. Next, we prove that fo

Published
2008

22. Drawing (Complete) Binary Tanglegrams: Hardness, Approximation, Fixed-Parameter Tractability

Author

Byrka, J. (Jaroslaw), Buchin, K., Buchin, M., Nollenburg, M., Okamoto, Y., Silveira, R.I., Wolff, A., Byrka, J. (Jaroslaw), Buchin, K., Buchin, M., Nollenburg, M., Okamoto, Y., Silveira, R.I., and Wolff, A.

Abstract

A \emph{binary tanglegram} is a pair $$ of binary trees whose leaf sets are in one-to-one correspondence; matching leaves are connected by inter-tree edges. For applications, for example in phylogenetics, it is essential that both trees are drawn without edge

Published
2008

24. Cabin crew rostering at KLM: optimization of reserves

Author

Analyse, Stochastiek, Dep Wiskunde, Bijvank, M., Byrka, J., van Heijster, P., Gnedin, A.V., Olejniczak, T., Swist, T., Zyprych, J., Bisseling, R.H., Mulder, J., Paelinck, M., de Ridder, H., Dajani, K., Dijkema, T.J., van de Leur, J.W., Zegeling, P.A., Analyse, Stochastiek, Dep Wiskunde, Bijvank, M., Byrka, J., van Heijster, P., Gnedin, A.V., Olejniczak, T., Swist, T., Zyprych, J., Bisseling, R.H., Mulder, J., Paelinck, M., de Ridder, H., Dajani, K., Dijkema, T.J., van de Leur, J.W., and Zegeling, P.A.

Published
2007

29. New algorithms for approximate Nash equilibria in bimatrix games

Author

Bosse, H., Byrka, J., Markakis, E., Bosse, H., Byrka, J., and Markakis, E.

Abstract

We consider the problem of computing additively approximate Nash equilibria in non-cooperative two-player games. We provide a new polynomial time algorithm that achieves an approximation guarantee of 0.36392. Our work improves the previously best known (0.38197¿+¿e)-approximation algorithm of Daskalakis, Mehta and Papadimitriou [6]. First, we provide a simpler algorithm, which also achieves 0.38197. This algorithm is then tuned, improving the approximation error to 0.36392. Our method is relatively fast, as it requires solving only one linear program and it is based on using the solution of an auxiliary zero-sum game as a starting point. The first author was supported by NWO. The second and third author were supported by the EU Marie Curie Research Training Network, contract numbers MRTN-CT-2003-504438-ADONET and MRTN-CT-2004-504438-ADONET respectively.

Published
2007

30. Partitioning a Call Graph

Author

van den Berg, J.B., Bhulai, S., Hulshof, J., Koole, G., Quant, C., Williams, J.F., Bisseling, R.H., Byrka, J., Cerav-Erbas, S., Gvozdenovic, N., Lorenz, M., Pendavingh, R., Reeves, C., Roger, M., Verhoeven, A., van den Berg, J.B., Bhulai, S., Hulshof, J., Koole, G., Quant, C., Williams, J.F., Bisseling, R.H., Byrka, J., Cerav-Erbas, S., Gvozdenovic, N., Lorenz, M., Pendavingh, R., Reeves, C., Roger, M., and Verhoeven, A.

Published
2006

31. Partitioning a Call Graph

Author

Analyse, Dep Wiskunde, Bisseling, R.H., Byrka, J., Cerav-Erbas, S., Gvozdenovic, N., Lorenz, M., Pendavingh, R., Reeves, C., Roger, M., Verhoeven, A., van den Berg, J.B., Bhulai, S., Hulshof, J., Koole, G., Quant, C., Williams, J.F., Analyse, Dep Wiskunde, Bisseling, R.H., Byrka, J., Cerav-Erbas, S., Gvozdenovic, N., Lorenz, M., Pendavingh, R., Reeves, C., Roger, M., Verhoeven, A., van den Berg, J.B., Bhulai, S., Hulshof, J., Koole, G., Quant, C., and Williams, J.F.

Published
2006

33. Partitioning a Call Graph

Author

Berg, J.B. van den, et al, not CWI, Bisseling, R.H. (Rob), Byrka, J. (Jaroslaw), Cerav-Erbas, S., Gvozdenovic, N. (Nebojsa), Lorenz, M., Pendavingh, R., Reeves, C., Röger, M., Verhoeven, A., Berg, J.B. van den, et al, not CWI, Bisseling, R.H. (Rob), Byrka, J. (Jaroslaw), Cerav-Erbas, S., Gvozdenovic, N. (Nebojsa), Lorenz, M., Pendavingh, R., Reeves, C., Röger, M., and Verhoeven, A.

Published
2006

35. Bucket Game with Applications to Set Multicover and Dynamic Page Migration

Author

Bienkowski, M. (Marcin), Byrka, J. (Jaroslaw), Bienkowski, M. (Marcin), and Byrka, J. (Jaroslaw)

Abstract

We present a simple two-person Bucket Game, based on throwing balls into buckets, and we discuss possible players’ strategies. We use these strategies to create an approximation algorithm for a generalization of the well known Set Cover problem, where we need to cover each element by at least k sets. Furthermore, we apply these strategies to construct a randomized algorithm for Dynamic Page Migration problem achieving the optimal competitive ratio against an oblivious adversary.

Published
2005

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