Generalized U(1) Gauge Field Theories and Fractal Dynamics

Abstract

We present a theoretical framework for a class of generalized U(1) gauge effective field theories. These theories are defined by specifying geometric patterns of charge configurations that can be created by local operators, which then lead to a class of generalized Gauss law constraints. The charge and magnetic excitations in these theories have restricted, subdimensional dynamics, providing a generalization of recently studied higher-rank symmetric U(1) gauge theories to the case where arbitrary spatial rotational symmetries are broken. These theories can describe situations where charges exist at the corners of fractal operators, thus providing a continuum effective field theoretic description of Haah's code and Yoshida's Sierpinski prism model. We also present a 3+1-dimensional U(1) theory that does not have a non-trivial discrete Zp counterpart.