Critical site percolation and cutsets
Abstract
In 2003, Kahn conjectured a characterization of the critical percolation probability pc in terms of vertex cut sets (JK03). Later, Lyons and Peres (2016) conjectured a similar characterization of pc , but in terms of edge cut sets (LP16). Both conjectures were subsequently proven by Tang (pt23) for bond percolation and site percolation on bounded-degree graphs. Tang further conjectured that Kahn's vertex-cut characterization for pcsite and the Lyons-Peres edge-cut characterization for pcsite would hold for site percolation on any infinite, connected, locally finite graph. In this paper, we establish Kahn's vertex-cut characterization for pcsite by adapting arguments from jmh57a, DCT15. Additionally, we disprove the Lyons-Peres edge-cut characterization for pcsite by constructing a counterexample.
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