Thresholds for Epidemic Spreading in Networks
Abstract
We study the threshold of epidemic models in quenched networks with degree distribution given by a power-law. For the susceptible-infected-susceptible model the activity threshold λc vanishes in the large size limit on any network whose maximum degree kmax diverges with the system size, at odds with heterogeneous mean-field (HMF) theory. The vanishing of the threshold has nothing to do with the scale-free nature of the network but stems instead from the largest hub in the system being active for any spreading rate λ>1/kmax and playing the role of a self-sustained source that spreads the infection to the rest of the system. The susceptible-infected-removed model displays instead agreement with HMF theory and a finite threshold for scale-rich networks. We conjecture that on quenched scale-rich networks the threshold of generic epidemic models is vanishing or finite depending on the presence or absence of a steady state.
- Publication:
-
Physical Review Letters
- Pub Date:
- November 2010
- DOI:
- arXiv:
- arXiv:1010.1646
- Bibcode:
- 2010PhRvL.105u8701C
- Keywords:
-
- 89.75.Hc;
- 05.70.Ln;
- 87.23.Ge;
- 89.75.Da;
- Networks and genealogical trees;
- Nonequilibrium and irreversible thermodynamics;
- Dynamics of social systems;
- Systems obeying scaling laws;
- Condensed Matter - Statistical Mechanics;
- Computer Science - Social and Information Networks;
- Physics - Physics and Society
- E-Print:
- 5 pages, 4 figures