The polynomial growth of effective resistances in one-dimensional critical long-range percolation
Abstract
We study the critical long-range percolation on Z, where an edge connects i and j independently with probability 1-\-β∫ii+1∫jj+1|u-v|-2 d u d v\ for |i-j|>1 for some fixed β>0 and with probability 1 for |i-j|=1. Viewing this as a random electric network where each edge has a unit conductance, we show that the effective resistances from 0 to [-n,n]c and from the interval [-n,n] to [-2n,2n]c (conditioned on no edge joining [-n,n] and [-2n,2n]c) both grow like nδ(β) for some δ(β)∈ (0,1).
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