The incipient infinite cluster of the FK-Ising model in dimensions d≥ 3 and the susceptibility of the high-dimensional Ising model

Abstract

We consider the critical FK-Ising measure φβc on Zd with d≥ 3. We construct the measure φ∞:=|x|→ ∞φβc[\:·\: |\: 0 x] and prove it satisfies φ∞[0 ∞]=1. This corresponds to the natural candidate for the incipient infinite cluster measure of the FK-Ising model. Our proof uses a result of Lupu and Werner (Electron. Commun. Probab., 2016) that relates the FK-Ising model to the random current representation of the Ising model, together with a mixing property of random currents recently established by Aizenman and Duminil-Copin (Ann. Math., 2021). We then study the susceptibility (β) of the nearest-neighbour Ising model on Zd. When d>4, we improve a previous result of Aizenman (Comm. Math. Phys., 1982) to obtain the existence of A>0 such that, for β<βc, equation* (β)= A1-β/βc(1+o(1)), equation* where o(1) tends to 0 as β tends to βc. Additionally, we relate the constant A to the incipient infinite cluster of the double random current.