Monotonicity properties for Bernoulli percolation on layered graphs -- a Markov chain approach
Abstract
A layered graph G× is the Cartesian product of a graph G = (V,E) with the linear graph Z, e.g. Z× is the 2D square lattice Z2. For Bernoulli percolation with parameter p ∈ [0,1] on G× one intuitively would expect that Pp((o,0) (v,n)) Pp((o,0) (v,n+1)) for all o,v ∈ V and n 0. This is reminiscent of the better known bunkbed conjecture. Here we introduce an approach to the above monotonicity conjecture that makes use of a Markov chain building the percolation pattern layer by layer. In case of finite G we thus can show that for some N 0 the above holds for all n N o,v ∈ V and p ∈ [0,1]. One might hope that this Markov chain approach could be useful for other problems concerning Bernoulli percolation on layered graphs.
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