Limited path percolation in complex networks
Abstract
We study the stability of network communication after removal of q=1-p links under the assumption that communication is effective only if the shortest path between nodes i and j after removal is shorter than aij (a≥1) where ij is the shortest path before removal. For a large class of networks, we find a new percolation transition at pc=(o-1)(1-a)/a, where o < k2>/< k> and k is the node degree. Below pc, only a fraction Nδ of the network nodes can communicate, where δ a(1-| p|/(o-1)) < 1, while above pc, order N nodes can communicate within the limited path length aij. Our analytical results are supported by simulations on Erdos-R\'enyi and scale-free network models. We expect our results to influence the design of networks, routing algorithms, and immunization strategies, where short paths are most relevant.
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