Critical long-range percolation II: Low effective dimension

Abstract

In long-range percolation on Zd, points x and y are connected by an edge with probability 1-(-β\|x-y\|-d-α), where α>0 is fixed and β ≥ 0 is a parameter. As d and α vary, the model is conjectured to exhibit eight qualitatively different second-order critical behaviours, with a transition between mean-field and low-dimensional regimes when d=\6,3α\, a transition between long- and short-range regimes at a crossover value αc(d), and with various logarithmic corrections at the boundaries between these regimes. This is the second of three papers developing a rigorous theory of the model's critical behavior in five of these eight regimes, including all long-range (LR) and high-dimensional (HD) regimes. We focus on the long-range low-dimensional (LR-LD) regime d/3<α<αc(d), where the model is below its upper critical dimension. Since computing αc(d) for 2<d<6 appears to be beyond the scope of current techniques, we give an axiomatic definition of the LR regime which we prove holds for α <1. Using this, we prove up-to-constants estimates for the critical and slightly subcritical two-point function in the LR regime and for the volume tail and k-point function in the LR-LD regime. We deduce that the critical exponents satisfy the identities \[ η = 2-α, γ = (2-η), and = df \] in the LR regime (if γ, , or is well-defined) and that δ and df follow the hyperscaling identities \[ δ = d+αd-α and df = d+α2 \] in the LR-LD regime. Our results are suggestive of conformal invariance in the LR-LD regime, with the critical k-point function matching an explicit M\"obius-covariant function up-to-constants.