Near-critical and finite-size scaling for high-dimensional lattice trees and animals

Abstract

We consider spread-out models of lattice trees and lattice animals on Zd, for d above the upper critical dimension d c=8. We define a correlation length and prove that it diverges as (pc-p)-1/4 at the critical point pc. Using this, we prove that the near-critical two-point function is bounded above by C|x|-(d-2)[-c(pc-p)1/4|x|]. We apply the near-critical bound to study lattice trees and lattice animals on a discrete d-dimensional torus (with d > d c) of volume V. For pc-p of order V-1/2, we prove that the torus susceptibility is of order V1/4, and that the torus two-point function behaves as |x|-(d-2) + V-3/4 and thus has a plateau of size V-3/4. The proofs require significant extensions of previous results obtained using the lace expansion.

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