Strict monotonicity, continuity, and bounds on the Kertész line for the random-cluster model on Zd

Abstract: Ising and Potts models can be studied using the Fortuin–Kasteleyn representation through the Edwards–Sokal coupling. This adapts to the setting where the models are exposed to an external field of strength h > 0. In this representation, which is also known as the random-cluster model, the Kertész line is the curve that separates two regions of the parameter space defined according to the existence of an infinite cluster in [Formula: see text]. This signifies a geometric phase transition between the ordered … Show more