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Nonequilibrium phase transitions and finite size scaling in weighted scale-free networks

We consider nonequilibrium phase transitions in weighted scale-free networks, in which highly connected nodes, which are created earlier in time are partially immunized. For epidemic spreading we solve the dynamical mean-field equations and discuss finite-size scaling theory. The theoretical predictions are confronted with the results of large scale Monte Carlo simulations on the weighted Barabási-Albert network. Local scaling exponents are found different at a typical site and at a node with very large connectivity.

preprint2005arXivOpen access
Márton KarsaiRóbert JuhászFerenc Iglói
cond-mat.stat-mechphysics.soc-phcond-mat.dis-nn
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Open access3 authors3 topics
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Citations: 0Reviews: 0Saves: 0Code: not linkedDataset: not linkedInstitutions: 0

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Márton KarsaiRóbert JuhászFerenc Iglói

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