Projective Ribbon Permutation Statistics: a Remnant of non-Abelian Braiding in Higher Dimensions

Abstract

In a recent paper, Teo and Kane proposed a 3D model in which the defects support Majorana fermion zero modes. They argued that exchanging and twisting these defects would implement a set R of unitary transformations on the zero mode Hilbert space which is a 'ghostly' recollection of the action of the braid group on Ising anyons in 2D. In this paper, we find the group T2n which governs the statistics of these defects by analyzing the topology of the space K2n of configurations of 2n defects in a slowly spatially-varying gapped free fermion Hamiltonian: T2n π1(K2n)$. We find that the group T2n= Z × Tr2n, where the 'ribbon permutation group' Tr2n is a mild enhancement of the permutation group S2n: Tr2n 2 × E((Z2)2n S2n). Here, E((Z2)2n S2n) is the 'even part' of (Z2)2n S2n, namely those elements for which the total parity of the element in (Z2)2n added to the parity of the permutation is even. Surprisingly, R is only a projective representation of T2n, a possibility proposed by Wilczek. Thus, Teo and Kane's defects realize `Projective Ribbon Permutation Statistics', which we show to be consistent with locality. We extend this phenomenon to other dimensions, co-dimensions, and symmetry classes. Since it is an essential input for our calculation, we review the topological classification of gapped free fermion systems and its relation to Bott periodicity.