Double-exponential susceptibility growth in Dyson's hierarchical model with |x-y|-2 interaction

Abstract

We study long-range percolation on the d-dimensional hierarchical lattice, in which each possible edge \x,y\ is included independently at random with inclusion probability 1- ( -β \|x-y\|-d-α ), where α>0 is fixed and β≥ 0 is a parameter. This model is known to have a phase transition at some βc<∞ if and only if α<d. We study the model in the regime α ≥ d, in which βc=∞, and prove that the susceptibility (β) (i.e., the expected volume of the cluster at the origin) satisfies \[ (β) = βdα - d - o(1) as β ∞ if α > d and ee (β) as β ∞ if α = d. \] This resolves a problem raised by Georgakopoulos and Haslegrave (2020), who showed that (β) grows between exponentially and double-exponentially when α=d. Our results imply that analogous results hold for a number of related models including Dyson's hierarchical Ising model, for which the double-exponential susceptibility growth we establish appears to be a new phenomenon even at the heuristic level.