A simple anisotropic three-dimensional quantum spin liquid with fracton topological order

Abstract

We present a three-dimensional cubic lattice spin model, anisotropic in the z direction, that exhibits fracton topological order. The latter is a novel type of topological order characterized by the presence of immobile pointlike excitations, named fractons, residing at the corners of an operator with two-dimensional support. As other recent fracton models, ours exhibits a subextensive ground state degeneracy: On an Lx× Ly× Lz three-torus, it has a 22Lz topological degeneracy, and an additional non-topological degeneracy equal to 2LxLy-2. The fractons can be combined into composite excitations that move either in a straight line along the z direction, or freely in the xy plane at a given height z. While our model draws inspiration from the toric code, we demonstrate that it cannot be adiabatically connected to a layered toric code construction. Additionally, we investigate the effects of imposing open boundary conditions on our system. We find zero energy modes on the surfaces perpendicular to either the x or y directions, and their absence on the surfaces normal to z. This result can be explained using the properties of the two kinds of composite two-fracton mobile excitations.