An improved decoupling inequality for random interlacements

Abstract

In this paper we obtain a decoupling feature of the random interlacements process Iu ⊂ Zd, at level u, d≥ 3. More precisely, we show that the trace of the random interlacements process on two disjoint finite sets, F and its translated F+x, can be coupled with high probability of success, when \|x\| is large, with the trace of a process of independent excursions, which we call the noodle soup process. As a consequence, we obtain an upper bound on the covariance between two [0,1]-valued functions depending on the configuration of the random interlacements on F and F+x, respectively. This improves a previous bound obtained by Sznitman in [12].