Controlling Epidemic Spread using Probabilistic Diffusion Models on Networks

February 16, 2022 Β· Declared Dead Β· πŸ› International Conference on Artificial Intelligence and Statistics

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Authors Amy Babay, Michael Dinitz, Aravind Srinivasan, Leonidas Tsepenekas, Anil Vullikanti arXiv ID 2202.08296 Category cs.DS: Data Structures & Algorithms Cross-listed cs.LG Citations 8 Venue International Conference on Artificial Intelligence and Statistics Last Checked 4 months ago
Abstract
The spread of an epidemic is often modeled by an SIR random process on a social network graph. The MinINF problem for optimal social distancing involves minimizing the expected number of infections, when we are allowed to break at most $B$ edges; similarly the MinINFNode problem involves removing at most $B$ vertices. These are fundamental problems in epidemiology and network science. While a number of heuristics have been considered, the complexity of these problems remains generally open. In this paper, we present two bicriteria approximation algorithms for MinINF, which give the first non-trivial approximations for this problem. The first is based on the cut sparsification result of Karger \cite{karger:mathor99}, and works when the transmission probabilities are not too small. The second is a Sample Average Approximation (SAA) based algorithm, which we analyze for the Chung-Lu random graph model. We also extend some of our results to tackle the MinINFNode problem.
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