Exponential decay in the loop O(n) model: n> 1, x<13+(n)

Abstract

We show that the loop O(n) model on the hexagonal lattice exhibits exponential decay of loop sizes whenever n> 1 and x<13+(n), for some suitable choice of (n)>0. It is expected that, for n ≤ 2, the model exhibits a phase transition in terms of~x, that separates regimes of polynomial and exponential decay of loop sizes. In this paradigm, our result implies that the phase transition for n ∈ (1,2] occurs at some critical parameter xc(n) strictly greater than that xc(1) = 1/3. The value of the latter is known since the loop O(1) model on the hexagonal lattice represents the contours of the spin-clusters of the Ising model on the triangular lattice. The proof is based on developing n as 1+(n-1) and exploiting the fact that, when x<13, the Ising model exhibits exponential decay on any (possibly non simply-connected) domain. The latter follows from the positive association of the FK-Ising representation.