Separated-occurrence inequalities for dependent percolation and Ising models
Abstract
Separated-occurrence inequalities are variants for dependent lattice models of the van den Berg-Kesten inequality for independent models. They take the form P(A r B) ≤ (1 + ce-ε r)P(A)P(B), where A r B is the event that A and B occur at separation r in a configuration ω, that is, there exist two random sets of bonds or sites separated by at least distance r, one set responsible for the occurrence of the event A in ω, the other for the occurrence of B. We establish such inequalities for certain subcritical FK models, and for certain Ising models which are at supercritical temperature or have an external field, with A and B increasing or decreasing events.
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