| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 473492 | Computers & Operations Research | 2012 | 7 Pages |
We introduce the following network optimization problem: given a directed graph with a cost function on the arcs, demands at the nodes, and a single source s, find the minimum cost connected subgraph from s such that its total demand is no less than lower bound D. We describe applications of this problem to disaster relief and media broadcasting, and show that it generalizes several well-known models including the knapsack problem, the partially ordered knapsack problem, the minimum branching problem, and certain scheduling problems. We prove that our problem is strongly NP-complete and give an integer programming formulation. We also provide five heuristic approaches, illustrate them with a numerical example, and provide a computational study on both small and large sized, randomly generated problems. The heuristics run efficiently on the tested problems and provide solutions that, on average, are fairly close to optimal.
► We model and describe a new network distribution problem. ► The model is well-applied to problems in disaster relief and media broadcasting. ► We provide efficient search-based and IP-based heuristics to solve this problem. ► Our computational study shows that the results are not far from optimal.
