Abstract
Urban railway transit systems are not only the main source of city trips but also provide important sup- port for city operations. In this study, we address the last train timetable optimization and bus bridging service problem in the context of urban railway transit networks. By exploiting problem-specific knowl- edge, we present an optimization-based approach that deals with the issue of last-train passengers being stranded at midnight by developing a last train and bus bridging coordination mixed integer linear pro- gramming (MILP) model. Due to the large problem size, an effective decomposition method is developed for solving the real-world and large-scale problems, which decomposes the original MILP into two smaller MILP models: maximizing last train connections and minimizing waiting times for rail-to-bus passengers. In addition, we prove that this decomposition method can solve the original MILP to global optimality. Finally, we apply the developed MILP models to the Vienna Subway to assess the effectiveness of the pro- posed approaches and conduct sensitivity analyses of the bus fleet size involved in the last train timetable optimization and bus bridging service problem.
Originalsprache | Englisch |
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Seiten (von - bis) | 1-14 |
Seitenumfang | 14 |
Fachzeitschrift | Omega |
Volume | 84 |
DOIs | |
Publikationsstatus | Veröffentlicht - 2018 |
Research Field
- Ehemaliges Research Field - Mobility Systems
Schlagwörter
- Urban railway transit
- Last train timetabling
- Bus bridging service management
- Mixed integer linear programming
- Decomposition method