Minimum cost flow‐dependent communication networks

Abstract

AbstractIn the construction of a communication network, the (Euclidean) length of the network is an important but not unique factor determining the cost of the network. Among many possible network models, Gilbert proposed a flow‐dependent model in which flow demands are assigned between each pair of points in a given point set A, and the cost per unit length of a link in the network is a function of the flow through the link. In this article we first investigate the properties of this Gilbert model: the concavity of the cost function, decomposition, local minimality, the number of Steiner points, and the maximum degree of Steiner points. Then we propose three heuristics for constructing minimum cost Gilbert networks. Two of them come from the fact that generally a minimum cost Gilbert network stands between two extremes: the complete network G(A) on A and the edge‐weighted Steiner minimal tree W(A) on A. The first heuristic starts with G(A) and reduces the cost by splitting angles; the second one starts with both G(A) and W(A), and reduces the cost by selecting low cost paths. As a generalization of the second heuristic, the third heuristic constructs a new Gilbert network of less cost by hybridizing known Gilbert networks. Finally, we discuss some considerations in practical applications. © 2006 Wiley Periodicals, Inc. NETWORKS, Vol. 48(1), 39–46 2006