Permutation actions on modular tensor categories of topological multilayer phases

Abstract

We find a non-trivial representation of the symmetric group Sn on the n-fold Deligne product C n of a modular tensor category C for any n ≥ 2. This is accomplished by checking that a particular family of C n-bimodule categories representing adjacent transpositions satisfies the symmetric group relations with respect to the relative Deligne product. The bimodule categories are based on a permutation action of S2 on C discussed by Fuchs and Schweigert in hep-th/1310.1329 , for which we show that it is, in a certain sense, unique. In the context of condensed matter physics, the Sn-representation corresponds to the specification of permutation twist surface defects in a (2+1)-dimensional topological multilayer phase, which are relevant to topological quantum computation and could promote the explicit construction of the data of an Sn-gauged phase.