Universal behavior of optimal paths in weighted networks with general disorder
Abstract
We study the statistics of the optimal path in both random and scale free networks, where weights w are taken from a general distribution P(w). We find that different types of disorder lead to the same universal behavior. Specifically, we find that a single parameter (S AL-1/ for d-dimensional lattices, and S AN-1/3 for random networks) determines the distributions of the optimal path length, including both strong and weak disorder regimes. Here is the percolation connectivity exponent, and A depends on the percolation threshold and P(w). For P(w) uniform, Poisson or Gaussian the crossover from weak to strong does not occur, and only weak disorder exists.
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