Square-root topological phase with time-reversal and particle-hole symmetry

Square-root topological phases have been discussed mainly for systems with chiral symmetry. In this paper, we analyze the topology of the squared Hamiltonian for systems preserving time-reversal and particle-hole symmetry. Our analysis elucidates that two-dimensional systems of class CII host helical edge states due to the nontrivial topology of the squared Hamiltonian in contrast to the absence of ordinary topological phases. The emergence of helical edge modes is demonstrated by analyzing a toy model. We also show the emergence of surface states induced by the nontrivial topology of the squared Hamiltonian in three dimensions.

Automated summary

The paper analyzes the topology of squared Hamiltonians for systems with time-reversal and particle-hole symmetry, revealing that two-dimensional systems of class CII have helical edge states due to nontrivial topology. The emergence of helical edge modes and surface states induced by the nontrivial topology of squared Hamiltonians in three dimensions is demonstrated in the toy model analysis.