Solving break minimization problems in mirrored double round-robin tournament with QUBO solver
The break minimization problem is a fundamental problem in sports scheduling. Recently, its quadratic unconstrained binary optimization (QUBO) formulation has been proposed, which has gained much interest with the rapidly growing field of quantum computing. In this paper, we demonstrate that the state-of-the-art QUBO solver outperforms the general mixed integer quadratic programming (MIQP) solver on break minimization problems in a mirrored double round-robin tournament. Moreover, we demonstrate that it still outperforms or is competitive even if we add practical constraints, such as consecutive constraints, to the break minimization problem.
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