Your search keyword '"Grigoriev, Alexander"' showing total 8 results

1. On the Minimum Corridor Connection Problem and Other Generalized Geometric Problems.

Author

Erlebach, Thomas, Kaklamanis, Christos, Bodlaender, Hans, Feremans, Corinne, Grigoriev, Alexander, Penninkx, Eelko, Sitters, René, and Wolle, Thomas

Abstract

In this paper we discuss the complexity and approximability of the minimum corridor connection problem where, given a rectilinear decomposition of a rectilinear polygon into "rooms", one has to find the minimum length tree along the edges of the decomposition such that every room is incident to a vertex of the tree. We show that the problem is strongly NP-hard and give an subexponential time exact algorithm. For the special case of k-outerplanar graphs the running time becomes O(n3). We develop a polynomial time approximation scheme for the case when all rooms are fat and have nearly the same size. When rooms are fat but are of varying size we give a polynomial time constant factor approximation algorithm. Keywords: minimum corridor connection, generalized geometric problems, complexity, exact algorithms, approximations. [ABSTRACT FROM AUTHOR]

Published

2007

2. Bundle Pricing with Comparable Items.

Author

Hutchison, David, Kanade, Takeo, Kittler, Josef, Kleinberg, Jon M., Mattern, Friedemann, Mitchell, John C., Naor, Moni, Nierstrasz, Oscar, Pandu Rangan, C., Steffen, Bernhard, Sudan, Madhu, Terzopoulos, Demetri, Tygar, Doug, Vardi, Moshe Y., Weikum, Gerhard, Arge, Lars, Hoffmann, Michael, Welzl, Emo, Grigoriev, Alexander, and van Loon, Joyce

Abstract

We consider a revenue maximization problem where we are selling a set of items, each available in a certain quantity, to a set of bidders. Each bidder is interested in one or several bundles of items. We assume the bidders' valuations for each of these bundles to be known. Whenever bundle prices are determined by the sum of single item prices, this algorithmic problem was recently shown to be inapproximable to within a semi-logarithmic factor. We consider two scenarios for determining bundle prices that allow to break this inapproximability barrier. Both scenarios are motivated by problems where items are different, yet comparable. First, we consider classical single item prices with an additional monotonicity constraint, enforcing that larger bundles are at least as expensive as smaller ones. We show that the problem remains strongly NP-hard, and we derive a PTAS. Second, motivated by real-life cases, we introduce the notion of affine price functions, and derive fixed-parameter polynomial time algorithms. [ABSTRACT FROM AUTHOR]

Published

2007

3. LP Rounding and an Almost Harmonic Algorithm for Scheduling with Resource Dependent Processing Times.

Author

Díaz, Josep, Jansen, Klaus, Rolim, José D. P., Zwick, Uri, Grigoriev, Alexander, Sviridenko, Maxim, and Uetz, Marc

Abstract

We consider a scheduling problem on unrelated parallel machines with the objective to minimize the makespan. In addition to its machine dependence, the processing time of any job is dependent on the usage of a scarce renewable resource, e.g. workers. A given amount of that resource can be distributed over the jobs in process at any time. The more of the resource is allocated to a job, the smaller is its processing time. This model generalizes the classical unrelated parallel machine scheduling problem by adding a time-resource tradeoff. It is also a natural variant of a generalized assignment problem studied by Shmoys and Tardos. On the basis of an integer linear programming formulation for (a relaxation of) the problem, we adopt a randomized LP rounding technique from Kumar et al. (FOCS 2005) in order to obtain a deterministic, integral LP solution that is close to optimum. We show how this rounding procedure can be used to derive a deterministic 3.75-approximation algorithm for the scheduling problem. This improves upon previous results, namely a deterministic 6.83-approximation, and a randomized 4-approximation. The improvement is due to the better LP rounding and a new scheduling algorithm that can be viewed as a restricted version of the harmonic algorithm for bin packing. [ABSTRACT FROM AUTHOR]

Published

2006

4. Scheduling Parallel Jobs with Linear Speedup.

Author

Erlebach, Thomas, Persinao, Giuseppe, Grigoriev, Alexander, and Uetz, Marc

Abstract

We consider a scheduling problem where a set of jobs is a-priori distributed over parallel machines. The processing time of any job is dependent on the usage of a scarce renewable resource, e.g. personnel. An amount of k units of that resource can be allocated to the jobs at any time, and the more of that resource is allocated to a job, the smaller its processing time. The dependence of processing times on the amount of resources is linear for any job. The objective is to find a resource allocation and a schedule that minimizes the makespan. Utilizing an integer quadratic programming relaxation, we show how to obtain a (3 + ε) -approximation algorithm for that problem, for any ε > 0. This generalizes and improves previous results, respectively. Our approach relies on a fully polynomial time approximation scheme to solve the quadratic programming relaxation. This result is interesting in itself, because the underlying quadratic program is NP-hard to solve. We also derive lower bounds, and discuss further generalizations of the results. [ABSTRACT FROM AUTHOR]

Published

2006

5. How to Sell a Graph: Guidelines for Graph Retailers.

Author

Fomin, Fedor V., Grigoriev, Alexander, Loon, Joyce, Sitters, René, and Uetz, Marc

Abstract

We consider a profit maximization problem where we are asked to price a set of m items that are to be assigned to a set of n customers. The items can be represented as the edges of an undirected (multi)graph G, where an edge multiplicity larger than one corresponds to multiple copies of the same item. Each customer is interested in purchasing a bundle of edges of G, and we assume that each bundle forms a simple path in G. Each customer has a known budget for her respective bundle, and is interested only in that particular bundle. The goal is to determine item prices and a feasible assignment of items to customers in order to maximize the total profit. When the underlying graph G is a path, we derive a fully polynomial time approximation scheme, complementing a recent NP-hardness result. If the underlying graph is a tree, and edge multiplicities are one, we show that the problem is polynomially solvable, contrasting its APX-hardness for the case of unlimited availability of items. However, if the underlying graph is a grid, and edge multiplicities are one, we show that it is even NP-complete to approximate the maximum profit to within a factor n1-ε. Keywords: Pricing problems, tollbooth problem, highway problem, computational complexity, dynamic programming, fully polynomial time approximation scheme. [ABSTRACT FROM AUTHOR]

Published

2006

6. Treewidth Lower Bounds with Brambles.

Author

Brodal, Gerth Stølting, Leonardi, Stefano, Bodlaender, Hans L., Grigoriev, Alexander, and Koster, Arie M.C.A.

Abstract

In this paper we present a new technique for computing lower bounds for graph treewidth. Our technique is based on the characterisation of the treewidth as the maximum order of a bramble of the graph. We give two algorithms: one for general graphs, and one for planar graphs. The algorithm for planar graphs is shown to give a lower bound for the treewidth that is at most a constant factor away from the exact treewidth. For both algorithms, we report on extensive computational experiments that show that the algorithms give often excellent lower bounds, in particular when applied to (close to) planar graphs. [ABSTRACT FROM AUTHOR]

Published

2005

7. Unrelated Parallel Machine Scheduling with Resource Dependent Processing Times.

Author

Jünger, Michael, Kaibel, Volker, Grigoriev, Alexander, Sviridenko, Maxim, and Uetz, Marc

Abstract

We consider unrelated parallel machine scheduling problems with the objective to minimize the schedule makespan. In addition to its machine-dependence, the processing time of any job is also dependent on the usage of a scarce renewable resource. An amount of k units of that resource, e.g. workers, can be distributed over the jobs in process, and the more of that resource is allocated to a job, the smaller its processing time. The model generalizes the classical unrelated machine scheduling problem, adding a resource-time tradeoff. It is also a natural variant of a generalized assignment problem studied previously by Shmoys and Tardos, the difference lying in the fact the resource is renewable and not a total budget constraint. We use a two-phased LP rounding technique to assign resources to jobs and jobs to machines. Combined with Graham's list scheduling, we thus prove the existence of a -approximation algorithm. We show how our approach can be adapted to scheduling problems with dedicated machines as well, with an improvement of the performance bound to . Moreover, we derive a lower bound of 2 for the employed LP-based analysis, and we prove a (3/2)-inapproximability result. [ABSTRACT FROM AUTHOR]

Published

2005

8. Algorithms for Graphs Embeddable with Few Crossings Per Edge.

Author

Liśkiewicz, Maciej, Reischuk, Rüdiger, Grigoriev, Alexander, and Bodlaender, Hans L.

Abstract

We consider graphs that can be embedded on a surface of bounded genus such that each edge has a bounded number of crossings. We prove that many optimization problems, including maximum independent set, minimum vertex cover, minimum dominating set and many others, admit polynomial time approximation schemes when restricted to such graphs. This extends previous results by Baker [1] and Eppstein [7] to a much broader class of graphs. [ABSTRACT FROM AUTHOR]

Published

2005