Combinatorial separation algorithms of complexity O(nm + m log m) are presented for the continuous knapsack polyhedra with divisible capacities; complemented partition inequalities are introduced that dominate the prior <=-partition inequalities and fully describe the <= polyhedron.
Mathematical Programming 156(1-2):1–20
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Combinatorial separation algorithms for the continuous knapsack polyhedra with divisible capacities
Combinatorial separation algorithms of complexity O(nm + m log m) are presented for the continuous knapsack polyhedra with divisible capacities; complemented partition inequalities are introduced that dominate the prior <=-partition inequalities and fully describe the <= polyhedron.