Facets and valid inequalities for the time-dependent travelling salesman problem

• Published in: European journal of operational research Vol. 236; no. 3; pp. 891 - 902
• Main Authors: Miranda-Bront, Juan José, Méndez-Díaz, Isabel, Zabala, Paula
• Format: Journal Article
• Language: English
• Published: Amsterdam Elsevier B.V 01.08.2014; Elsevier Sequoia S.A
• Subjects: Algorithms; Branch and Cut; Cities; Combinatorial optimization; Effectiveness studies; Formulations; Inequalities; Integer programming; Operational research; Time-Dependent TSP; Tours; Transportation problem (Operations research); Traveling salesman problem; Integer programming; Time-Dependent TSP; Combinatorial optimization; Branch and Cut
• ISSN: 0377-2217; 1872-6860
• DOI: 10.1016/j.ejor.2013.05.022

•We study theoretical properties of two formulations for the Time-Dependent TSP.•We derive five families of facets and five other families of valid inequalities.•The theoretical framework presented can be used to derive more families of facets.•The polyhedral study significantly reduced the computing times of a B&C algorithm.•The TDTSP stands as a very challenging problem to be solved by exact algorithms. The Time-Dependent Travelling Salesman Problem (TDTSP) is a generalization of the traditional TSP where the travel cost between two cities depends on the moment of the day the arc is travelled. In this paper, we focus on the case where the travel time between two cities depends not only on the distance between them, but also on the position of the arc in the tour. We consider two formulations proposed in the literature, we analyze the relationship between them and derive several families of valid inequalities and facets. In addition to their theoretical properties, they prove to be very effective in the context of a Branch and Cut algorithm.