Topological edge states in two-dimensional Z4 Potts paramagnet protected by the Z4× 3 symmetry

Abstract

We construct a two-dimensional bosonic symmetry-protected topological (SPT) paramagnet protected by an on-site G=Z4× 3 symmetry, starting from a three-component Z4 Potts paramagnet on a triangular lattice. Within the group-cohomology framework, H3(G,U(1)) Z4× 7, we focus on a "colorless" cocycle representative obtained by antisymmetrizing the basic Z4 three-cocycle, and generate the corresponding SPT Hamiltonian via a cocycle-induced nonlocal unitary transformation followed by symmetry averaging. For open geometry, we derive the boundary theory explicitly: one color sector decouples, while the nontrivial edge reduces to an interacting Z4 chain with next-to-nearest-neighbor constraints that admits a compact dressed-Potts form. Using DMRG we show that the boundary model is gapless, with the lowest gap scaling as 1/L and an entanglement-entropy scaling consistent with a conformal field theory of central charge c=2.191(4) 11/5. The rational value c=11/5 matches the coset SU(3)3/SU(2)3, making it a candidate for the continuum description of the Z4× 3 edge; we outline spectral and symmetry-resolved diagnostics needed to test this identification at the level of conformal towers beyond the central charge.

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