2023
DOI: 10.1002/rsa.21145
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Approximately counting independent sets in bipartite graphs via graph containers

Abstract: By implementing algorithmic versions of Sapozhenko's graph container methods, we give new algorithms for approximating the number of independent sets in bipartite graphs. Our first algorithm applies to 𝑑-regular, bipartite graphs satisfying a weak expansion condition: when 𝑑 is constant, and the graph is a bipartite Ξ©(log 2 π‘‘βˆ•π‘‘)-expander, we obtain an FPTAS for the number of independent sets. Previously such a result for 𝑑 > 5 was known only for graphs satisfying the much stronger expansion conditions of … Show more

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Cited by 3 publications
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