Fractional Vortices, Z2 Gauge Theory, and the Confinement-Deconfinement Transition

Abstract

In this paper we discuss the classical 3D XY model whose nearest-neighbor interaction is a mixture of (θi-θj) (ferromagnetic) and 2(θi-θj) (nematic). This model is dual to a theory with integer and half-integer vortices. While both types of vortices interact with a non-compact U(1) gauge field (the "EM" interaction), the half-vortices interact with an extra interaction mediated by a Z2 gauge field. We shall discuss the confinement-deconfinement transition of the half-integer vortices, the Wilson and the 't Hooft loops and their mutual statistics in path integral language. In addition, we shall present a quantum version of the classical model which exhibits these physics.