Internal Levin-Wen models

Abstract

Levin-Wen models are a class of two-dimensional lattice spin models with a Hamiltonian that is a sum of commuting projectors, which describe topological phases of matter related to Drinfeld centres. We generalise this construction to lattice systems internal to a topological phase described by an arbitrary modular fusion category C. The lattice system is defined in terms of an orbifold datum A in C, from which we construct a state space and a commuting-projector Hamiltonian HA acting on it. The topological phase of the degenerate ground states of HA is characterised by a modular fusion category CA defined directly in terms of A. By choosing different A's for a fixed C, one obtains precisely all phases which are Witt-equivalent to C. As special cases we recover the Kitaev and the Levin-Wen lattice models from instances of orbifold data in the trivial modular fusion category of vector spaces, as well as phases obtained by anyon condensation in a given phase C.