Quasi-Topological Quantum Field Theories and Z2 Lattice Gauge Theories

Abstract

We consider a two parameter family of Z2 gauge theories on a lattice discretization T(M) of a 3-manifold M and its relation to topological field theories. Familiar models such as the spin-gauge model are curves on a parameter space . We show that there is a region 0 of where the partition function and the expectation value <WR(γ)> of the Wilson loop for a curve γ can be exactly computed. Depending on the point of 0, the model behaves as topological or quasi-topological. The partition function is, up to a scaling factor, a topological number of M. The Wilson loop on the other hand, does not depend on the topology of γ. However, for a subset of 0, <WR(γ)> depends on the size of γ and follows a discrete version of an area law. At the zero temperature limit, the spin-gauge model approaches the topological and the quasi-topological regions depending on the sign of the coupling constant.