Caprara, A and Fischetti, M and Letchford, A N (2000) *On the separation of maximally violated mod-k cuts.* Mathematical Programming, 87 (1). pp. 37-56. ISSN 0025-5610

## Abstract

Separation is of fundamental importance in cutting-plane based techniques for Integer Linear Programming (ILP). In recent decades, a considerable research effort has been devoted to the definition of effective separation procedures for families of well-structured cuts. In this paper we address the separation of Chvátal rank-1 inequalities in the context of general ILP’s of the form min {c^Tx: Ax≤b,x integer}, where A is an m×n integer matrix and b an m-dimensional integer vector. In particular, for any given integer k we study mod-k cuts of the form λ^T A x ≤ ⌊λ T b⌋ for any λ ∈ {0,1/k,...,(k−1)/k}^m such that λ^T A is integer. Following the line of research recently proposed for mod-2 cuts by Applegate, Bixby, Chvátal and Cook [1] and Fleischer and Tardos [19], we restrict to maximally violated cuts, i.e., to inequalities which are violated by (k−1)/k by the given fractional point. We show that, for any given k, such a separation requires O(mn min{m,n}) time. Applications to both the symmetric and asymmetric TSP are discussed. In particular, for any given k, we propose an O(|V|^2|E*|)-time exact separation algorithm for mod-k cuts which are maximally violated by a given fractional (symmetric or asymmetric) TSP solution with support graph G *=(V,E*). This implies that we can identify a maximally violated cut for the symmetric TSP whenever a maximally violated (extended) comb inequality exists. Finally, facet-defining mod-k cuts for the symmetric and asymmetric TSP are studied.

Item Type: | Article |
---|---|

Journal or Publication Title: | Mathematical Programming |

Subjects: | |

Departments: | Lancaster University Management School > Management Science |

ID Code: | 43272 |

Deposited By: | ep_importer_pure |

Deposited On: | 11 Jul 2011 18:56 |

Refereed?: | Yes |

Published?: | Published |

Last Modified: | 27 Feb 2017 01:58 |

Identification Number: | |

URI: | http://eprints.lancs.ac.uk/id/eprint/43272 |

### Actions (login required)

View Item |