Convergence of k-point functions in high dimensional percolation
Abstract
Consider critical Bernoulli percolation on Zd for d large; let y0, …, yk-1 be k distinct points in Rd. We prove that the probability that \ n yi\i=0k-1 all lie in the same open cluster, rescaled by an appropriate power of n, converges as n ∞ to an explicit constant. This confirms a conjecture of Aizenman and Newman.
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