Sharp phase transition for random loop models on trees

Volker Betz; Johannes Ehlert; Benjamin Lees; Lukas Roth

doi:10.1214/21-EJP677

Sharp phase transition for random loop models on trees

Volker Betz, Johannes Ehlert, Benjamin Lees, Lukas Roth

Research output: Contribution to journal › Article (Academic Journal) › peer-review

2 Citations (Scopus)

Abstract

We investigate the random loop model on the d-ary tree. For d≥3, we establish a (locally) sharp phase transition for the existence of infinite loops. Moreover, we derive rigorous bounds that in principle allow to determine the value of the critical parameter with arbitrary precision. Additionally, we prove the existence of an asymptotic expansion for the critical parameter in terms of d−1. The corresponding coefficients can be determined in a schematic way and we calculate them up to order 6.

Original language	English
Article number	133
Pages (from-to)	1-26
Number of pages	26
Journal	Electronic Journal of Probability
Volume	26
DOIs	https://doi.org/10.1214/21-EJP677
Publication status	Published - 25 Nov 2021

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title = "Sharp phase transition for random loop models on trees",

abstract = "We investigate the random loop model on the d-ary tree. For d≥3, we establish a (locally) sharp phase transition for the existence of infinite loops. Moreover, we derive rigorous bounds that in principle allow to determine the value of the critical parameter with arbitrary precision. Additionally, we prove the existence of an asymptotic expansion for the critical parameter in terms of d−1. The corresponding coefficients can be determined in a schematic way and we calculate them up to order 6.",

author = "Volker Betz and Johannes Ehlert and Benjamin Lees and Lukas Roth",

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AU - Betz, Volker

AU - Ehlert, Johannes

AU - Lees, Benjamin

AU - Roth, Lukas

PY - 2021/11/25

Y1 - 2021/11/25

N2 - We investigate the random loop model on the d-ary tree. For d≥3, we establish a (locally) sharp phase transition for the existence of infinite loops. Moreover, we derive rigorous bounds that in principle allow to determine the value of the critical parameter with arbitrary precision. Additionally, we prove the existence of an asymptotic expansion for the critical parameter in terms of d−1. The corresponding coefficients can be determined in a schematic way and we calculate them up to order 6.

AB - We investigate the random loop model on the d-ary tree. For d≥3, we establish a (locally) sharp phase transition for the existence of infinite loops. Moreover, we derive rigorous bounds that in principle allow to determine the value of the critical parameter with arbitrary precision. Additionally, we prove the existence of an asymptotic expansion for the critical parameter in terms of d−1. The corresponding coefficients can be determined in a schematic way and we calculate them up to order 6.

U2 - 10.1214/21-EJP677

DO - 10.1214/21-EJP677

M3 - Article (Academic Journal)

SN - 1083-6489

VL - 26

SP - 1

EP - 26

JO - Electronic Journal of Probability

JF - Electronic Journal of Probability

M1 - 133

ER -

Sharp phase transition for random loop models on trees

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