Truncation of long-range percolation with non-summable interactions in dimensions d≥ 3

Abstract

Consider independent long-range percolation on Zd for d≥ 3. Assuming that the expected degree of the origin is infinite, we show that there exists an N∈ N such that an infinite open cluster remains after deleting all edges of length at least N. For the isotropic case in dimensions d≥ 3, we show that if the expected degree of the origin is at least 10400, then there exists an infinite open cluster almost surely. We also use these results to prove corresponding statements for the long-range q-states Potts model.

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