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1

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Matrix Decomposition by Branch-and-Cut (1997)

Borndörfer, Ralf ; Ferreira, Carlos E. ; Martin, Alexander

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Publication Date: 2020-03-09

Description: In this paper we investigate whether matrices arising from linear or integer programming problems can be decomposed into so-called {\em bordered block diagonal form}. More precisely, given some matrix $A$, we try to assign as many rows as possible to some number of blocks of limited size such that no two rows assigned to different blocks intersect in a common column. Bordered block diagonal form is desirable because it can guide and speed up the solution process for linear and integer programming problems. We show that various matrices from the %LP- and MIP-libraries \Netlib{} and MIPLIB can indeed be decomposed into this form by computing optimal decompositions or decompositions with proven quality. These computations are done with a branch-and-cut algorithm based on polyhedral investigations of the matrix decomposition problem.

Keywords: ddc:000

Language: English

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2

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Set Packing Relaxations of Some Integer Programs (1997)

Borndörfer, Ralf ; Weismantel, Robert

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Publication Date: 2020-08-05

Description: This paper is about {\em set packing relaxations\/} of combinatorial optimization problems associated with acyclic digraphs and linear orderings, cuts and multicuts, and vertex packings themselves. Families of inequalities that are valid for such a relaxation as well as the associated separation routines carry over to the problems under investigation.

Keywords: ddc:000

Language: English

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3

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Telebus Berlin – Mobilität für Behinderte (1997)

Borndörfer, Ralf ; Grötschel, Martin ; Klostermeier, Fridolin ; [et al.]

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Publication Date: 2020-08-05

Language: English

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4

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Umlaufplanung im öffentlichen Nahverkehr (1994)

Borndörfer, Ralf ; Grötschel, Martin ; Löbel, Andreas

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Publication Date: 2020-08-05

Language: English

Type: conferenceobject , doc-type:conferenceObject

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5

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Dienstplanung im öffentlichen Nahverkehr (1997)

Borndörfer, Ralf ; Grötschel, Martin ; Löbel, Andreas

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Publication Date: 2020-08-05

Language: English

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6

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Optimierung des Berliner Behindertenfahrdienstes (1997)

Borndörfer, Ralf ; Grötschel, Martin ; Klostermeier, Fridolin ; [et al.]

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Publication Date: 2020-08-05

Language: English

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7

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Berliner Telebussystem bietet Mobilität für Behinderte (1997)

Borndörfer, Ralf ; Grötschel, Martin ; Klostermeier, Fridolin ; [et al.]

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Publication Date: 2020-08-05

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8

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Alcuin's Transportation Problems and Integer Programming (1995)

Borndörfer, Ralf ; Grötschel, Martin ; Löbel, Andreas

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Publication Date: 2020-08-05

Description: The need to solve {\it transportation problems\/} was and still is one of the driving forces behind the development of the mathematical disciplines of graph theory, optimization, and operations research. Transportation problems seem to occur for the first time in the literature in the form of the four ''River Crossing Problems'' in the book Propositiones ad acuendos iuvenes. The {\it Propositiones\/} ---the oldest collection of mathematical problems written in Latin--- date back to the $8$th century A.D. and are attributed to Alcuin of York, one of the leading scholars of his time, a royal advisor to Charlemagne at his Frankish court. Alcuin's river crossing problems had no impact on the development of mathematics. However, they already display all the characteristics of today's large-scale real transportation problems. From our point of view, they could have been the starting point of combinatorics, optimization, and operations research. We show the potential of Alcuin's problems in this respect by investigating his problem~18 about a wolf, a goat and a bunch of cabbages with current mathematical methods. This way, we also provide the reader with a leisurely introduction into the modern theory of integer programming.

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9

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On the Complexity of Storage Assignment Problems. (1994)

Abdel-Hamid, Atef Abdel-Aziz ; Borndörfer, Ralf

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Publication Date: 2020-03-09

Description: {\def\NP{\hbox{$\cal N\kern-.1667em\cal P$}} The {\sl storage assignment problem} asks for the cost minimal assignment of containers with different sizes to storage locations with different capacities. Such problems arise, for instance, in the optimal control of automatic storage devices in flexible manufacturing systems. This problem is known to be $\NP$-hard in the strong sense. We show that the storage assignment problem is $\NP$-hard for {\sl bounded sizes and capacities}, even if the sizes have values $1$ and~$2$ and the capacities value~$2$ only, a case we encountered in practice. Moreover, we prove that no polynomial time $\epsilon$-approximation algorithm exists. This means that almost all storage assignment problems arising in practice are indeed hard.}

Keywords: ddc:000

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10

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Decomposing Matrices into Blocks (1997)

Borndörfer, Ralf ; Ferreira, Carlos E. ; Martin, Alexander

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Publication Date: 2020-08-05

Description: In this paper we investigate whether matrices arising from linear or integer programming problems can be decomposed into so-called {\em bordered block diagonal form}. More precisely, given some matrix $A$, we try to assign as many rows as possible to some number of blocks of limited size such that no two rows assigned to different blocks intersect in a common column. Bordered block diagonal form is desirable because it can guide and speed up the solution process for linear and integer programming problems. We show that various matrices from the LP- and MIP-libraries NETLIB and MITLIB can indeed be decomposed into this form by computing optimal decompositions or decompositions with proven quality. These computations are done with a branch-and-cut algorithm based on polyhedral investigations of the matrix decomposition problem. In practice, however, one would use heuristics to find a good decomposition. We present several heuristic ideas and test their performance. Finally, we investigate the usefulness of optimal matrix decompositions into bordered block diagonal form for integer programming by using such decompositions to guide the branching process in a branch-and-cut code for general mixed integer programs.

Keywords: ddc:000

Language: English

Type: reportzib , doc-type:preprint

Format: application/postscript

Format: application/pdf

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