Mean-field behavior of nearest-neighbor oriented percolation on the BCC lattice above 8+1 dimensions

Abstract

In this paper, we consider nearest-neighbor oriented percolation with independent Bernoulli bond-occupation probability on the d-dimensional body-centered cubic (BCC) lattice Ld and the set of non-negative integers Z+. Thanks to the orderly structure of the BCC lattice, we prove that the infrared bound holds on Ld×Z+ in all dimensions d≥ 9. As opposed to ordinary percolation, we have to deal with complex numbers due to asymmetry induced by time-orientation, which makes it hard to bound the bootstrap functions in the lace-expansion analysis. By investigating the Fourier-Laplace transform of the random-walk Green function and the two-point function, we derive the key properties to obtain the upper bounds and resolve a problematic issue in Nguyen and Yang's bound. The issue is caused by the fact that the Fourier transform of the random-walk transition probability can take the value -1.

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