Emergent Symmetry and Phase Transitions on the Domain Wall of Z2 Topological Orders

Abstract

The one-dimensional (1D) domain wall of 2D Z2 topological orders is studied theoretically. The Ising domain wall model is shown to have an emergent SU(2)1 conformal symmetry because of a hidden nonsymmorphic octahedral symmetry. While a weak magnetic field is an irrelevant perturbation to the bulk topological orders, it induces a domain wall transition from the Tomonaga-Luttinger liquid to a ferromagnetic order, which spontaneously breaks the anomalous Z2 symmetry and the time-reversal symmetry on the domain wall. Moreover, the gapless domain wall state also realizes a 1D topological quantum critical point between a Z2T-symmetry-protected topological phase and a trivial phase, thus demonstrating the holographic construction of topological transitions.