On the decentralized navigation of multiple packages on transportation networks

Abstract

We investigate by numerical simulation and finite-size analysis the impact of long-range shortcuts on a spatially embedded transportation network. Our networks are built from two-dimensional (d=2) square lattices to be improved by the addition of long-range shortcuts added with probability P(rij) rij-α [J. M. Kleinberg, Nature 406, 845 (2000)]. Considering those improved networks, we performed numerical simulation of multiple discrete package navigation and found a limit for the amount of packages flowing through the network. Such limit is characterized by a critical probability of creating packages pc, where above this value a transition to a congested state occurs. Moreover, pc is found to follow a power-law, pc L-γ, where L is the network size. Our results indicate the presence of an optimal value of α min≈1.7, where the parameter γ reaches its minimum value and the networks are more resilient to congestion for larger system sizes.