The Attractive Traveling Salesman Problem |
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| Authors: | Gü neş Erdoğan,Jean-Franç ois Cordeau,Gilbert Laporte |
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| Affiliation: | 1. Ozyegin University Engineering Faculty, Ku?bak??? Sokak No. 2, 34662 Altunizade, ?stanbul, Turkey;2. Canada Research Chair in Logistics and Transportation, HEC Montréal, 3000 chemin de la Côte-Sainte-Catherine, Montréal, Canada H3T 2A7;3. Canada Research Chair in Distribution Management, HEC Montréal, 3000 chemin de la Côte-Sainte-Catherine, Montréal, Canada H3T 2A7 |
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| Abstract: | ![]()
In the Attractive Traveling Salesman Problem the vertex set is partitioned into facility vertices and customer vertices. A maximum profit tour must be constructed on a subset of the facility vertices. Profit is computed through an attraction function: every visited facility vertex attracts a portion of the profit from the customer vertices based on the distance between the facility and customer vertices, and the attractiveness of the facility vertex. A gravity model is used for computing the profit attraction. The problem is formulated as an integer non-linear program. A linearization is proposed and strengthened through the introduction of valid inequalities, and a branch-and-cut algorithm is developed. A tabu search algorithm is also implemented. Computational results are reported. |
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| Keywords: | Traveling Salesman Problem Demand attraction Demand allocation Linearization Branch-and-cut Tabu search |
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