Negative correlation of adjacent Busemann increments

Abstract

We consider i.i.d. last-passage percolation on Z2 with weights having distribution F and time-constant gF. We provide an explicit condition on the large deviation rate function for independent sums of F that determines when some adjacent Busemann function increments are negatively correlated. As an example, we prove that Bernoulli(p) weights for p > p* ≈ 0.6504 satisfy this condition. We prove this condition by establishing a direct relationship between the negative correlations of adjacent Busemann increments and the dominance of the time-constant gF by the function describing the time-constant of last-passage percolation with exponential or geometric weights.