A new proof of the bunkbed conjecture in the p 1 limit

Abstract

For a finite simple graph G, the bunkbed graph G is defined to be the product graph G K2. We will label the two copies of a vertex v∈ V(G) as v- and v+. The bunkbed conjecture, posed by Kasteleyn, states that for independent bond percolation on G, percolation from u- to v- is at least as likely as percolation from u- to v+, for any u,v∈ V(G). Despite the plausibility of this conjecture, so far the problem in full generality remains open. Recently, Hutchcroft, Nizi\'c-Nikolac, and Kent gave a proof of the conjecture in the p 1 limit. Here we present a new proof of the bunkbed conjecture in this limit, working in the more general setting of allowing different probabilities on different edges of G.