Minimizing the waiting time for a one-way shuttle service

Consider a terminal in which users arrive continuously over a finite period of time at a variable rate known in advance. A fleet of shuttles has to carry them over a fixed trip. What is the shuttle schedule that minimizes their waiting time? This is the question addressed in the present paper. We consider several versions that differ according to whether the shuttles come back to the terminal after their trip or not, and according to the objective function (maximum or average of the waiting times). We propose efficient algorithms with proven performance guarantees for almost all versions, and we completely solve the case where all users are present in the terminal from the beginning, a result which is already of some interest. The techniques used are of various types (convex optimization, shortest paths, ...). The paper ends with numerical experiments showing that most of our algorithms behave also well in practice.

[1]  Karl Nachtigall,et al.  A genetic algorithm approach to periodic railway synchronization , 1996, Comput. Oper. Res..

[2]  Paolo Toth,et al.  A column generation approach to train timetabling on a corridor , 2008, 4OR.

[3]  Dennis Huisman,et al.  The New Dutch Timetable: The OR Revolution , 2008, Interfaces.

[4]  Stephen C. Graves,et al.  Little's Law , 2008 .

[5]  Leo G. Kroon,et al.  A Variable Trip Time Model for Cyclic Railway Timetabling , 2003, Transp. Sci..

[6]  Gilbert Laporte,et al.  Exact formulations and algorithm for the train timetabling problem with dynamic demand , 2014, Comput. Oper. Res..

[7]  Rolf H. Möhring,et al.  A Case Study in Periodic Timetabling , 2002, ATMOS.

[8]  Gerd Finke,et al.  Scheduling chemical experiments , 2007 .

[9]  Tal Grinshpoun,et al.  A reduction approach to the two-campus transport problem , 2014, J. Sched..

[10]  Xiaoqiang Cai,et al.  Greedy heuristics for rapid scheduling of trains on a single track , 1998 .

[11]  Matteo Fischetti,et al.  Modeling and Solving the Train Timetabling Problem , 2002, Oper. Res..

[12]  Paolo Toth,et al.  Non-cyclic train timetabling and comparability graphs , 2010, Oper. Res. Lett..

[13]  Roberto Cordone,et al.  Optimizing the demand captured by a railway system with a regular timetable , 2011 .

[14]  L. Barbosa,et al.  Deterministic Inventory Lot Size Models--A General Root Law , 1978 .

[15]  Christian Liebchen,et al.  Finding Short Integral Cycle Bases for Cyclic Timetabling , 2003, ESA.

[16]  Miguel A. Salido,et al.  New Heuristics to Solve the "CSOP" Railway Timetabling Problem , 2006, IEA/AIE.

[17]  Walter Ukovich,et al.  A Mathematical Model for Periodic Scheduling Problems , 1989, SIAM J. Discret. Math..

[18]  Sally A. Goldman,et al.  TCP dynamic acknowledgment delay (extended abstract): theory and practice , 1998, STOC '98.