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arxiv: 1404.2374 · v1 · pith:7EN2MBOYnew · submitted 2014-04-09 · 🧬 q-bio.QM · cs.SI· physics.soc-ph· q-bio.MN

A signature of power law network dynamics

classification 🧬 q-bio.QM cs.SIphysics.soc-phq-bio.MN
keywords networksevolvingnetworkedgesgraphgrowingholdslogarithm
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Can one hear the 'sound' of a growing network? We address the problem of recognizing the topology of evolving biological or social networks. Starting from percolation theory, we analytically prove a linear inverse relationship between two simple graph parameters--the logarithm of the average cluster size and logarithm of the ratio of the edges of the graph to the theoretically maximum number of edges for that graph--that holds for all growing power law graphs. The result establishes a novel property of evolving power-law networks in the asymptotic limit of network size. Numerical simulations as well as fitting to real-world citation co-authorship networks demonstrate that the result holds for networks of finite sizes, and provides a convenient measure of the extent to which an evolving family of networks belongs to the same power-law class.

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