Convergence of the critical finite-range contact process to super-Brownian motion above the upper critical dimension: I. The higher-point functions

Abstract

We consider the critical spread-out contact process in Zd with d1, whose infection range is denoted by L1. In this paper, we investigate the r-point function τ t(r)( x) for r3, which is the probability that, for all i=1,...,r-1, the individual located at xi∈ Zd is infected at time ti by the individual at the origin o∈ Zd at time 0. Together with the results of the 2-point function in [van der Hofstad and Sakai, Electron. J. Probab. 9 (2004), 710-769; arXiv:math/0402049], on which our proofs crucially rely, we prove that the r-point functions converge to the moment measures of the canonical measure of super-Brownian motion above the upper-critical dimension 4. We also prove partial results for d4 in a local mean-field setting.