Mühendislik Fakültesi / Faculty of Engineering
Permanent URI for this collectionhttps://hdl.handle.net/11727/1401
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Item Formulations for Minimizing Tour Duration of the Traveling Salesman Problem with Time Windows(2015) Kara, Imdat; Derya, Tusan; ABH-1078-2021Traveling Salesman Problem with Time Windows (TSPTW) serves as one of the most important variants of the Traveling Salesman Problem (TSP). The main objective functions expressed in the literature of the TSPTW consist of the following: (1) to minimize total distance travelled (or to minimize total travel time spent on the arcs), (2) to minimize total cost of traveling on the arcs and cost of waiting before services, or (3) to minimize total time passed from depot to depot (tour duration). When the unit cost of traveling and unit cost of waiting appear equal, then one may solve the problem just minimizing tour duration. According to our best knowledge, only one formulation with nonlinear constraints considers the aim of minimizing tour duration for symmetric case. However, for just minimizing tour duration, we haven't seen any linear formulation for symmetric and any general formulation for asymmetric TSPTW. In this paper, for minimizing tour duration, we propose polynomial size integer linear programming formulation for symmetric and asymmetric TSPTW separately. The performances of our proposed formulations are tested on well-known benchmark instances used to minimize total travel time spent on the arcs. For symmetric TSPTW, our proposed formulation sufficiently and capably finds optimal solutions for all instances (the biggest are with 400 customers) in an extremely short time with CPLEX 12.4. For asymmetric TSPTW, we used instances generated from a real life problem which were used for minimizing total arc cost. We used these instances for minimizing tour duration and observe that, optimal solutions of the most of the instances up to 232 nodes are obtained within seconds. In addition, the proposed formulation for asymmetric case obtained 7 new best known solutions. (C) 2015 The Authors. Published by Elsevier B.V.Item New Formulations for the Orienteering Problem(2016) Kara, Imdat; Bicakci, Papatya Sevgin; Derya, Tusan; ABH-1078-2021Problems associated with determining optimal routes from one or several depots (origin, home city) to a set of nodes (vertices, cities, customers, locations) are known as routing problems. The Traveling Salesman Problem (TSP) lies at the heart of routing problems. One of the new variants of the TSP is named as TSP with Profits where the traveler must finish its journey within a predetermined time (cost, distance), by optimizing given objective. In this variant of TSP, all cities ought to not to be visited. The Orienteering Problem (OP) is the most studied case of TSP with Profits which comes from an outdoor sport played on mountains. In OP, traveler gets a gain (profit, reward) from the visited node and the objective is to maximize the total gain that the traveler collects during the predetermined time. The OP is also named as selective TSP. In this paper, we present two polynomial size formulations for OP. The performance of our proposed formulations is tested on benchmark instances. We solved the benchmark problems from the literature via CPLEX 12.5 by using the proposed formulations and existing formulation. The computational experiments demonstrate that; (1) both of the new formulations over estimates the existing one; and (2) the proposed formulations are capable of solving all the benchmark instances that were solved by using special heuristics so far. (C) 2016 The Authors. Published by Elsevier B.V. This is an open access article under the CC BY-NC-ND license