Bosonic Short Range Entangled states Beyond Group Cohomology classification

Abstract

We explore and construct a class of bosonic short range entangled (BSRE) states in all 4k+2 spatial dimensions, which are higher dimensional generalizations of the well-known Kitaev's E8 state in 2d. These BSRE states share the following properties: (1) their bulk is fully gapped and nondegenerate; (2) their (4k+1)d boundary is described by a "self-dual" rank-2k antisymmetric tensor gauge field, and it is guaranteed to be gapless without assuming any symmetry; (3) their (4k+1)d boundary has intrinsic gravitational anomaly once coupled to the gravitational field; (4) their bulk is described by an effective Chern-Simons field theory with rank-(2k+1) antisymmetric tensor fields, whose KIJ matrix is identical to that of the E8 state in 2d; (5) The existence of these BSRE states lead to various bosonic symmetry protected topological (BSPT) states as their descendants in other dimensions; (6) These BSRE states can be constructed by confining fermionic degrees of freedom from 8 copies of (4k+2)d SRE states with fermionic 2k-branes; (7) After compactifying the (4k+2)d BSRE state on a closed 4k dimensional manifold, depending on the topology of the compact 4k manifold, the system could reduce to nontrivial 2d BSRE states.