Large-party limit of topological entanglement entropy in Chern-Simons theory

Abstract

We investigate the topological entanglement entropy of quantum states arising in the context of three-dimensional Chern-Simons theory with compact gauge group G and Chern-Simons level k. We focus on the quantum states associated with the Tdm,dn torus link complements, which is a d-party pure quantum state, and analyze its large-party limit, i.e., d ∞ limit. We show that the entanglement measures in this limit will receive contributions only from the Abelian anyons, and non-Abelian sectors are suppressed in the large-party limit. Consequently, the large-party limiting value of the entanglement entropy has an upper bound of |ZG|, where |ZG| is the order of the center of the group G. As an explicit example, we perform quantitative analysis for the simplest case of the SU(2) group and Td,dn torus link to obtain the large-party limit of the entanglement entropy. We further investigate the semiclassical (k ∞) limit of the entropies after taking the large-party limit for this particular example.