Percolation of both signs in a triangular-type 3D Ising model above Tc

Abstract

Let T be the two-dimensional triangular lattice, and Z the one-dimensional integer lattice. Let T× Z denote the Cartesian product graph. Consider the Ising model defined on this graph with inverse temperature β and external field h, and let βc be the critical inverse temperature when h=0. We prove that for each β∈[0,βc), there exists hc(β)>0 such that both a unique infinite +cluster and a unique infinite -cluster coexist whenever |h|<hc(β). The same coexistence result also holds for the three-dimensional triangular lattice.

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