Sports Timetabling Papers
2022
-
Optimizing rest times and differences in games played: an iterative two-phase approach. Journal of Scheduling. 25, 261–271. (2022).
-
A fix-and-optimize heuristic for the ITC2021 sports timetabling problem. Journal of Scheduling. 25, 273–286. (2022).
-
Pseudo-Boolean optimisation for RobinX sports timetabling. Journal of Scheduling. 25, 287–299. (2022).
-
Multi-neighborhood simulated annealing for the sports timetabling competition ITC2021. Journal of Scheduling. 25, 301–319. (2022).
2019
-
The sport teams grouping problem. Annals of Operations Research. 275, 223–243. (2019).
2016
-
A combined local search and integer programming approach to the traveling tournament problem. Annals of Operations Research. 239, 343–354. (2016).
2014
-
Round-robin tournaments with homogeneous rounds. Annals of Operations Research. 218, 115-128. (2014).
-
A 2.75-approximation algorithm for the unconstrained traveling tournament problem. Annals of Operations Research. 218, 237-247. (2014).
-
A 5.875-approximation for the Traveling Tournament Problem. Annals of Operations Research. 218, 347-360. (2014).
-
Decomposition and local search based methods for the traveling umpire problem. European Journal of Operational Research. 238(3), (2014).
2012
-
Scheduling Major League Baseball Umpires and the Traveling Umpire Problem. Interfaces. 42, 232-244. (2012).
-
Locally Optimized Crossover for the Traveling Umpire Problem. European Journal of Operational Research. 216, 286 - 292. (2012).
-
Sports scheduling: Problems and applications. International Transactions in Operational Research. 19, 201–226. (2012).
-
An ILS heuristic for the traveling tournament problem with predefined venues. Annals of Operations Research. 194, 137-150. (2012).
-
Comparing league formats with respect to match importance in Belgian football. Annals of Operations Research. 194, 223-240. (2012).
-
An effective greedy heuristic for the Social Golfer Problem. Annals of Operations Research. 194, 413-425. (2012).
-
An approximation algorithm for the traveling tournament problem. Annals of Operations Research. 194, 317-324. (2012).
-
An improved SAT formulation for the social golfer problem. Annals of Operations Research. 194, 427-438. (2012).
2011
-
Benders' cuts guided large neighborhood search for the traveling umpire problem. Naval Research Logistics (NRL). 58, 771–781. (2011).
2010
-
Scheduling in sports: An annotated bibliography. Computers & Operations Research. 37, 1 - 19. (2010).
2007
-
Constructive Algorithms for the Constant Distance Traveling Tournament Problem. (Burke, E. K., & Rudová H., Ed.).Practice and Theory of Automated Timetabling VI. 3867, 135-146. (2007).
-
Scheduling the Brazilian Soccer Tournament with Fairness and Broadcast Objectives. (Burke, E. K., & Rudová H., Ed.).Practice and Theory of Automated Timetabling VI. 3867, 147-157. (2007).
-
Referee Assignment in Sports Leagues. (Burke, E. K., & Rudová H., Ed.).Practice and Theory of Automated Timetabling VI. 3867, 158-173. (2007).
-
A Branch-and-Cut Algorithm for Scheduling the Highly-Constrained Chilean Soccer Tournament. (Burke, E. K., & Rudová H., Ed.).Practice and Theory of Automated Timetabling VI. 3867, 174-186. (2007).
2003
-
Integer and Constraint Programming Approaches for Round-Robin Tournament Scheduling. (Burke, E. K., & De Causmaecker P., Ed.).Practice and Theory of Automated Timetabling IV. 2740, 63-77. (2003).
-
Characterizing Feasible Pattern Sets with a Minimum Number of Breaks. (Burke, E. K., & De Causmaecker P., Ed.).Practice and Theory of Automated Timetabling IV. 2740, 78-99. (2003).
-
Solving the Travelling Tournament Problem: A Combined Integer Programming and Constraint Programming Approach. (Burke, E. K., & De Causmaecker P., Ed.).Practice and Theory of Automated Timetabling IV. 2740, 100-109. (2003).
2001
-
A Schedule-Then-Break Approach to Sports Timetabling. (Burke, E. K., & Erben W., Ed.).Practice and Theory of Automated Timetabling III. 2079, 242-253. (2001).
1998
-
Construction of basic match schedules for sports competitions by using graph theory. (Burke, E. K., & Carter M. W., Ed.).Practice and Theory of Automated Timetabling II. 1408, 201-210. (1998).