Fractional topological charge in lattice Abelian gauge theory

Abstract

We construct a non-trivial U(1)/Zq principal bundle on~T4 from the compact U(1) lattice gauge field by generalizing L\"uscher's constriction so that the cocycle condition contains Zq elements (the 't~Hooft flux). The construction requires an admissibility condition on lattice gauge field configurations. From the transition function so constructed, we have the fractional topological charge that is Zq one-form gauge invariant and odd under the lattice time reversal transformation. Assuming a rescaling of the vacuum angle θ qθ suggested from the Witten effect, our construction provides a lattice implementation of the mixed 't~Hooft anomaly between the Zq one-form symmetry and the time reversal symmetry in the U(1) gauge theory with matter fields of charge~q∈2Z when θ=π, which was studied by Honda and Tanizaki [J. High Energy Phys. 12, 154 (2020)] in the continuum framework.