Delay Management Including Capacities of Stations

The question of delay management (DM) is whether trains should wait for delayed feeder trains or should depart on time. Solutions to this problem strongly depend on the capacity constraints of the tracks making sure that no two trains can use the same piece of track at the same time. While these capacity constraints have been included in integer programming formulations for DM, the capacity constraints of the stations (only offering a limited number of platforms) have been neglected so far. This can lead to highly infeasible solutions. In order to overcome this problem we suggest two new formulations for DM both including the stations' capacities. We present numerical results showing that the assignment-based formulation is clearly superior to the packing formulation. We furthermore propose an iterative algorithm in which we improve the platform assignment with respect to the current delays of the trains at each station in each step. We will show that this subproblem asks for coloring the nodes of a graph with a given number of colors while minimizing the weight of the conflicts. We show that the graph to be colored is an interval graph and that the problem can be solved in polynomial time by presenting a totally unimodular IP formulation.

[1]  Marco Laumanns,et al.  A New Resource-Constrained Multicommodity Flow Model for Conflict-Free Train Routing and Scheduling , 2011, Transp. Sci..

[2]  Peter Widmayer,et al.  Online Delay Management on a Single Train Line , 2004, ATMOS.

[3]  Matthias Ehrgott,et al.  Routing Trains Through Railway Junctions: A New Set-Packing Approach , 2011, Transp. Sci..

[4]  Anita Schöbel,et al.  Capacity constraints in delay management , 2009, Public Transp..

[5]  Leena Suhl,et al.  A note on the online nature of the railway delay management problem , 2011, Networks.

[6]  Dario Pacciarelli,et al.  Job-shop scheduling with blocking and no-wait constraints , 2002, Eur. J. Oper. Res..

[7]  Martine Labbé,et al.  Optimization models for the single delay management problem in public transportation , 2008, Eur. J. Oper. Res..

[8]  Alexander Schrijver,et al.  Combinatorial optimization. Polyhedra and efficiency. , 2003 .

[9]  Michael Gatto,et al.  On the Impact of Uncertainty on some Optimization Problems: Combinatorial Aspects of Delay Management and Robust Online Scheduling , 2007 .

[10]  Leo Kroon,et al.  Routing trains through railway stations: complexity issues , 1997 .

[11]  Sven Oliver Krumke,et al.  Extensions to online delay management on a single train line: new bounds for delay minimization and profit maximization , 2011, Math. Methods Oper. Res..

[12]  Matthias Ehrgott,et al.  Railway track allocation: models and methods , 2011, OR Spectr..

[13]  Dennis Huisman,et al.  Delay Management with Rerouting of Passengers , 2012, Transp. Sci..

[14]  Michael Schachtebeck,et al.  Delay Management in Public Transportation: Capacities, Robustness, and Integration , 2010 .

[15]  Dario Pacciarelli,et al.  A tabu search algorithm for rerouting trains during rail operations , 2007 .

[16]  Dennis Huisman,et al.  Delay Management with Re-Routing of Passengers , 2010, ATMOS.

[17]  Anita Schöbel,et al.  A Model for the Delay Management Problem based on Mixed-Integer-Programming , 2001, ATMOS.

[18]  Anita Schöbel,et al.  To Wait or Not to Wait - And Who Goes First? Delay Management with Priority Decisions , 2010, Transp. Sci..

[19]  Anita Schöbel,et al.  Integer Programming Approaches for Solving the Delay Management Problem , 2004, ATMOS.

[20]  C. Conte,et al.  Identifying dependencies among delays , 2008 .

[21]  Dario Pacciarelli,et al.  Discrete Optimization A branch and bound algorithm for scheduling trains in a railway network , 2007 .

[22]  Dennis Huisman,et al.  An iterative optimization framework for delay management and train scheduling , 2012 .

[23]  Dario Pacciarelli,et al.  Bi-objective conflict detection and resolution in railway traffic management , 2012 .

[24]  Leon Peeters,et al.  The Computational Complexity of Delay Management , 2005, WG.

[25]  Anita Schöbel,et al.  To Wait or Not to Wait? The Bicriteria Delay Management Problem in Public Transportation , 2007, Transp. Sci..

[26]  Sebastian Stiller,et al.  Online railway delay management: Hardness, simulation and computation , 2011, Simul..

[27]  Paolo Toth,et al.  Solution of the Train Platforming Problem , 2011, Transp. Sci..