Nonsymmorphic spin-space cubic groups and SU(2)1 conformal invariance in one-dimensional spin-1/2 models

Abstract

Recently, extended gapless phases with emergent SU(2)1 conformal invariance occupying finite regions in the phase diagrams have been found in one-dimensional spin-1/2 models with nonsymmorphic Oh symmetry groups. In this work, we investigate the question of whether the conditions for emergent SU(2)1 invariance can be loosened. We find that besides the nonsymmorphic Oh group, the other four smaller nonsymmorphic cubic groups including O, Th, Td and T can also give rise to emergent SU(2)1 invariance. Minimal spin-1/2 models having these nonsymmorphic cubic groups as symmetry groups are constructed, and numerical evidences for the emergent SU(2)1 invariance are provided. Our work is useful for understanding gapless phases in one-dimensional spin systems with nonsymmorphic symmetries.