Gapped Lineon and Fracton Models on Graphs

Abstract

We introduce a ZN stabilizer code that can be defined on any spatial lattice of the form × CLz, where is a general graph. We also present the low-energy limit of this stabilizer code as a Euclidean lattice action, which we refer to as the anisotropic ZN Laplacian model. It is gapped, robust (i.e., stable under small deformations), and has lineons. Its ground state degeneracy (GSD) is expressed in terms of a "mod N-reduction" of the Jacobian group of the graph . In the special case when space is an L× L× Lz cubic lattice, the logarithm of the GSD depends on L in an erratic way and grows no faster than O(L). We also discuss another gapped model, the ZN Laplacian model, which can be defined on any graph. It has fractons and a similarly strange GSD.