Cost of material or information flow in complex transportation networks

Abstract

To analyze the transport of information or material from a source to every node of a network we use two quantities introduced in the study of river networks: the cost and the flow. For a network with K nodes and M levels, we show that an upper bound to the global cost is C0,max KM. From numerical simulations for spanning tree networks with scale-free topology and with 102 up to 107 nodes, it is found, for large K, that the average number of levels and the global cost are given by M (K) and C0 K (K), respectively. These results agree very well with the ones obtained from a mean-field approach. If the network is characterized by a degree distribution of connectivity P(k) k- γ, we also find that the transport efficiency increases as long as γ decreases and that spanning tree networks with scale-free topology are more optimized to transfer information or material than random networks.