Spreading Paths in Partially Observed Social Networks

Overview

Journal Phys Rev E Stat Nonlin Soft Matter Phys

Publisher American Physical Society

Specialties Biophysics
Physiology
Public Health

Date 2012 May 17

PMID 22587148

Citations 10

Authors

Jukka-Pekka Onnela

Nicholas A Christakis

Affiliations

Soon will be listed here.

Abstract

Understanding how and how far information, behaviors, or pathogens spread in social networks is an important problem, having implications for both predicting the size of epidemics, as well as for planning effective interventions. There are, however, two main challenges for inferring spreading paths in real-world networks. One is the practical difficulty of observing a dynamic process on a network, and the other is the typical constraint of only partially observing a network. Using static, structurally realistic social networks as platforms for simulations, we juxtapose three distinct paths: (1) the stochastic path taken by a simulated spreading process from source to target; (2) the topologically shortest path in the fully observed network, and hence the single most likely stochastic path, between the two nodes; and (3) the topologically shortest path in a partially observed network. In a sampled network, how closely does the partially observed shortest path (3) emulate the unobserved spreading path (1)? Although partial observation inflates the length of the shortest path, the stochastic nature of the spreading process also frequently derails the dynamic path from the shortest path. We find that the partially observed shortest path does not necessarily give an inflated estimate of the length of the process path; in fact, partial observation may, counterintuitively, make the path seem shorter than it actually is.

Citing Articles

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Improving short-term information spreading efficiency in scale-free networks by specifying top large-degree vertices as the initial spreaders.

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Impact of degree truncation on the spread of a contagious process on networks.

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Inferring propagation paths for sparsely observed perturbations on complex networks.

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