Critical point for infinite cycles in a random loop model on trees

Abstract

We study a spatial model of random permutations on trees with a time parameter T>0, a special case of which is the random stirring process. The model on trees was first analysed by Bj\"ornberg and Ueltschi[BU16], who established the existence of infinite cycles for T slightly above a putatively identified critical value but left open behaviour at arbitrarily high values of T. We show the existence of infinite cycles for all T greater than a constant, thus classifying behaviour for all values of T and establishing the existence of a sharp phase transition. Numerical studies [BBBU15] of the model on Zd have shown behaviour with strong similarities to what is proven for trees.