Topological aspects of $4$D Abelian lattice gauge theories with the $theta$ parameter


Abstract in English

We study a four-dimensional $U(1)$ gauge theory with the $theta$ angle, which was originally proposed by Cardy and Rabinovici. It is known that the model has the rich phase diagram thanks to the presence of both electrically and magnetically charged particles. We discuss the topological nature of the oblique confinement phase of the model at $theta=pi$, and show how its appearance can be consistent with the anomaly constraint. We also construct the $SL(2,mathbb{Z})$ self-dual theory out of the Cardy-Rabinovici model by gauging a part of its one-form symmetry. This self-duality has a mixed t Hooft anomaly with gravity, and its implications on the phase diagram is uncovered. As the model shares the same global symmetry and t Hooft anomaly with those of $SU(N)$ Yang-Mills theory, studying its topological aspects would provide us more hints to explore possible dynamics of non-Abelian gauge theories with nonzero $theta$ angles.

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