English

Phase transition in loop percolation

Probability 2014-03-25 v1

Abstract

We are interested in the clusters formed by a Poisson ensemble of Markovian loops on infinite graphs. This model was introduced and studied in [LeJ12] and [LL12]. It is a model with long range correlations with two parameters α\alpha and κ\kappa. The non-negative parameter α\alpha measures the amount of loops, and κ\kappa plays the role of killing on vertices penalizing (κ>0\kappa>0) or favoring (κ<0\kappa<0) appearance of large loops. It was shown in [LL12] that for any fixed κ\kappa and large enough α\alpha, there exists an infinite cluster in the loop percolation on Zd\mathbb{Z}^d. In the present article, we show a non-trivial phase transition on the integer lattice Zd\mathbb{Z}^d (d3d\geq 3) for κ=0\kappa=0. More precisely, we show that there is no loop percolation for κ=0\kappa=0 and α\alpha small enough. Interestingly, we observe a critical like behavior on the whole sub-critical domain of α\alpha, namely, for κ=0\kappa=0 and any sub-critical value of α\alpha, the probability of one-arm event decays at most polynomially. For d5d\geq 5, we prove that there exists a non-trivial threshold for the finiteness of the expected cluster size. For α\alpha below this threshold, we calculate, up to a constant factor, the decay of the probability of one-arm event, two point function, and the tail distribution of the cluster size. These rates are comparable with the ones obtained from a single large loop and only depend on the dimension. For d=3d=3 or 44, we give better lower bounds on the decay of the probability of one-arm event, which show importance of small loops for long connections. In addition, we show that the one-arm exponent in dimension 33 depends on the intensity α\alpha. [LeJ12] Y. Le Jan, Amas de lacets markoviens, C. R. Math. Acad. Sci. Paris 350 (2012), no.13-14, 643-646. [LL12] Y. Le Jan and S. Lemaire, Markovian loop clusters on graphs, arXiv.org:1211.0300

Keywords

Cite

@article{arxiv.1403.5687,
  title  = {Phase transition in loop percolation},
  author = {Yinshan Chang and Artëm Sapozhnikov},
  journal= {arXiv preprint arXiv:1403.5687},
  year   = {2014}
}

Comments

47 pages, 3 figures

R2 v1 2026-06-22T03:32:12.254Z