A repair strategy to the attacked random and scale-free networks

Abstract

With a simple attack and repair evolution model, we investigate the stability and structural changes of the Erdos-Renyi random graphs (RG) and Barabasi-Albert scale-free (SF) networks. We introduce a new quantity, invulnerability I(s), to describe the stability of the system. We find that both RG and SF networks can evolve to a stationary state. The stationary value Ic has a power-law dependence on the repair probability pre. We also analyze the effects of the repair strategy to the attack tolerance of the networks. We observe that there is a threshold, (kmax)c, for the maximum degree. The maximum degree kmax at time s will be no smaller than (kmax)c. We give further information on the evolution of the networks by comparing the changes of the topological parameters, such as degree distribution P(k), average degree <k>, shortest path length L, clustering coefficient C, assortativity r, under the initial and stationary states.

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