Fragile topological insulators protected by rotation symmetry without spin-orbit coupling

Abstract

We present a series of models of three-dimensional rotation-symmetric fragile topological insulators in class AI (time-reversal symmetric and spin-orbit-free systems), which have gapless surface states protected by time-reversal (T) and n-fold rotation (Cn) symmetries (n=2,4,6). Our models are generalizations of Fu's model of a spinless topological crystalline insulator, in which orbital degrees of freedom play the role of pseudo-spins. We consider minimal surface Hamiltonian with Cn symmetry in class AI and discuss possible symmetry-protected gapless surface states, i.e., a quadratic band touching and multiple Dirac cones with linear dispersion. We characterize topological structure of bulk wave functions in terms of two kinds of topological invariants obtained from Wilson loops: Z2 invariants protected by Cn (n=4,6) and time-reversal symmetries, and C2T-symmetry-protected Z invariants (the Euler class) when the number of occupied bands is two. Accordingly, our models realize two kinds of fragile topological insulators. One is a fragile Z topological insulator whose only nontrivial topological index is the Euler class that specifies the number of surface Dirac cones. The other is a fragile Z2 topological insulator having gapless surface states with either a quadratic band touching or four (six) Dirac cones, which are protected by time-reversal and C4 (C6) symmetries. Finally, we discuss the instability of gapless surface states against the addition of s-orbital bands and demonstrate that surface states are gapped out through hybridization with surface-localized s-orbital bands.