In-homogeneous Virus Spread in Networks

Abstract

Our N-intertwined model (now called NIMFA) for virus spread in any network with N nodes is extended to a full heterogeneous setting. The metastable steady-state nodal infection probabilities are specified in terms of a generalized Laplacian, that possesses analogous properties as the classical Laplacian in graph theory. The critical threshold that separates global network infection from global network health is characterized via an N dimensional vector that makes the largest eigenvalue of a modified adjacency matrix equal to unity. Finally, the steady-state infection probability of node i is convex in the own curing rate δi, but concave in the curing rates δj of the other nodes 1≤ j≠ i≤ N in the network.