Wilson-'t Hooft operators and the theta angle

Abstract

We consider (3+1)-dimensional SU(N)/ ZN Yang-Mills theory on a space-time with a compact spatial direction, and prove the following result: Under a continuous increase of the theta angle θθ+2π, a 't Hooft operator T(γ) associated with a closed spatial curve γ that winds around the compact direction undergoes a monodromy T(γ) T(γ). The new 't Hooft operator T(γ) transforms under large gauge transformations in the same way as the product T(γ) W(γ), where W(γ) is the Wilson operator associated with the curve γ and the fundamental representation of SU(N).