Part I: Staggered index and 3D winding number of Kramers-degenerate bands

Abstract

For three-dimensional (3D) crystalline insulators, preserving space-inversion (P) and time-reversal (T) symmetries, the third homotopy class of two-fold, Kramers-degenerate bands is described by a 3D winding number n3,j ∈ Z, where j is the band index. It governs space group symmetry-protected, instanton or tunneling configurations of SU(2) Berry connection, and the quantization of magneto-electric coefficient θj = n3,j π. We show that |n3,j| for realistic, ab initio band structures can be identified from a staggered symmetry-indicator AF,j ∈ Z and the gauge-invariant spectrum of SU(2) Wilson loops. The procedure is elucidated for 4-band and 8-band tight-binding models and ab initio band structure of Bi, which is a Z2-trivial, higher-order, topological crystalline insulator. When the tunneling is protected by Cnh and Dnh point groups, the proposed method can also identify the signed winding number n3,j. Our analysis distinguishes between magneto-electrically trivial (θ=0) and non-trivial (θ=2 s π, with s ≠ 0) topological crystalline insulators. In Part II, we demonstrate Z-classification of θ by computing induced electric charge (Witten effect) on magnetic Dirac monopoles.