A lower bound for the chemical distance in sparse long-range percolation models
Abstract
We consider long-range percolation in dimension d≥ 1, where distinct sites x and y are connected with probability px,y∈[0,1]. Assuming that px,y is translation invariant and that px,y=\|x-y\|-s+o(1) with s>2d, we show that the graph distance is at least linear with the Euclidean distance.
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