A Cellular Representation of the Potts Lattice Higgs Model

Abstract

The i-dimensional Potts lattice Higgs model is a random assignment of spins in Zq to the i-dimensional cells of a cell complex induced by a Hamiltonian with a Potts interaction on the (i+1)-cells and an additional term playing the role of an external field. We develop a representation of this model as a pair of dependent plaquette percolations, and prove that Wilson line expectations can be expressed in terms of the probability of a topological event. As an application, we prove the existence of a phase transition for the Marcu--Fredenhagen ratio in the Potts lattice Higgs model on Zd when i=1.