Fair Curing and Network Design in SIS Epidemic Processes
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This paper studies efficient algorithms for dynamic curing policies and the corresponding network design problems to guarantee the fast extinction of epidemic spread in a susceptible-infected-susceptible (SIS) model. We consider a Markov process-based SIS epidemic model. We call a curing policy fair if demographic groups are cured with comparable speeds. We propose a fair curing policy based on the curing policy of Drakopoulos et al. Since these optimization problems are NP-hard, finding optimal policies is intractable for large graphs. We provide approximation guarantees on both curing and fair curing policies. Moreover, when the total infection rate is large, the original curing policy includes a waiting period in which no measures are taken to mitigate the spread until the rate slows down. To avoid the waiting period, we study network design problems to reduce the total infection rate by deleting edges or reducing the weight of edges. Then the curing processes become continuous since the total infection rate is restricted by network design. We provide algorithms with provable guarantees for the considered network design problems. In summary, the proposed fair curing and network design algorithms together provide an effective, fair, and computationally efficient approach that mitigates SIS epidemic spread in networks.
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