Wire constructions of Abelian topological phases in three or more dimensions

TL;DR

This paper develops a comprehensive coupled-wire construction method for three-dimensional Abelian topological phases, enabling the characterization of excitations, degeneracies, and surface states, and extends to arbitrary dimensions.

Contribution

It introduces a geometric arrangement-based strategy to realize and analyze 3D topological phases using coupled wires, expanding the theoretical toolkit beyond 2D.

Findings

Constructed pointlike and linelike excitations in 3D topological phases

Determined topological degeneracy using the new method

Extended the approach to arbitrary dimensions

Abstract

Coupled-wire constructions have proven to be useful tools to characterize Abelian and non-Abelian topological states of matter in two spatial dimensions. In many cases, their success has been complemented by the vast arsenal of other theoretical tools available to study such systems. In three dimensions, however, much less is known about topological phases. Since the theoretical arsenal in this case is smaller, it stands to reason that wire constructions, which are based on one-dimensional physics, could play a useful role in developing a greater microscopic understanding of three-dimensional topological phases. In this paper, we provide a comprehensive strategy, based on the geometric arrangement of commuting projectors in the toric code, to generate and characterize coupled-wire realizations of strongly-interacting three-dimensional topological phases. We show how this method can be used to construct pointlike and linelike excitations, and to determine the topological degeneracy. We also point out how, with minor modifications, the machinery already developed in two dimensions can be naturally applied to study the surface states of these systems, a fact that has implications for the study of surface topological order. Finally, we show that the strategy developed for the construction of three-dimensional topological phases generalizes readily to arbitrary dimensions, vastly expanding the existing landscape of coupled-wire theories. Throughout the paper, we discuss $\mathbb{Z}^{\,}_m$ topological order in three and four dimensions as a concrete example of this approach, but the approach itself is not limited to this type of topological order.