Theory of linear and integer programming
Theory of linear and integer programming
The generalized basis reduction algorithm
Mathematics of Operations Research
Hard Equality Constrained Integer Knapsacks
Proceedings of the 9th International IPCO Conference on Integer Programming and Combinatorial Optimization
The Cunningham-Geelen Method in Practice: Branch-Decompositions and Integer Programming
INFORMS Journal on Computing
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At the IPCO VI conference CornuÉjols and Dawande proposed a set of 0-1 linear programming instances that proved to be very hard to solve by traditional methods, and in particular by linear programming based branch-and-bound. They offered these market split instances as a challenge to the integer programming community. The market split problem can be formulated as a system of linear diophantine equations in 0-1 variables. In our study we use the algorithm of Aardal, Hurkens, and Lenstra (1998) based on lattice basis reduction. This algorithm is not restricted to deal with market split instances only but is a general method for solving systems of linear diophantine equations with bounds on the variables. We show computational results from solving both feasibility and optimization versions of the market split instances with up to 7 equations and 60 variables, and discuss various branching strategies and their effect on the number of nodes enumerated. To our knowledge, the largest feasibility and optimization instances solved before have 6 equations and 50 variables, and 4 equations and 30 variables respectively. We also present a probabilistic analysis describing how to compute the probability of generating infeasible market split instances. The formula used by CornuÉjols and Dawande tends to produce relatively many feasible instances for sizes larger than 5 equations and 40 variables.