We consider the minimum energy problem for a mobile ad hoc network, where any node in the network may communicate with any other via intermediate nodes. To provide quality of service, the network must be connected, even if one or more nodes drop out. This motivates the notion of κ-connectivity. The minimum energy problem aims to optimize the total energy that all nodes spend for transmission. Previous work in the literature includes exact mixed-integer programming formulations for a 1-connected network. We extend these models for when the network is κ-connected, and compare the models for various network sizes. As expected, the combinatorial nature of the problem limits the size of the networks that we can solve to optimality in a timely manner. However, these exact models may be used for the future design of mobile ad hoc networks and provide useful benchmarks for heuristics in larger networks. © 2010 ICST Institute for Computer Sciences, Social-Informatics and Telecommunications Engineering.
CITATION STYLE
Burt, C., Chan, Y. B., & Sonenberg, N. (2010). Exact models for the κ-connected minimum energy problem. In Lecture Notes of the Institute for Computer Sciences, Social-Informatics and Telecommunications Engineering (Vol. 28 LNICST, pp. 392–406). https://doi.org/10.1007/978-3-642-11723-7_26
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