A sprinkled decoupling inequality for Gaussian processes and applications

Abstract

We establish a sprinkled decoupling inequality for increasing events of Gaussian vectors with an error that depends only on the maximum pairwise correlation. As an application we prove the non-triviality of the percolation phase transition for Gaussian fields on Zd or Rd with (i) uniformly bounded local suprema, and (ii) correlations which decay at least polylogarithmically in the distance with exponent γ > 3; this expands the scope of existing results on non-triviality of the phase transition, covering new examples such as non-stationary fields and monochromatic random waves.