Non-Abelian Stokes theorem and quantized Berry flux

Abstract

Band topology of anomalous quantum Hall insulators can be precisely addressed by computing Chern numbers of constituent non-degenerate bands that describe quantized, Abelian Berry flux through two-dimensional Brillouin zone. Can Chern numbers be defined for SU(2) Berry connection of two-fold degenerate bands of materials preserving space-inversion (P) and time-reversal (T) symmetries or combined PT symmetry, without detailed knowledge of underlying basis? We affirmatively answer this question by employing a non-Abelian generalization of Stokes' theorem and describe a manifestly gauge-invariant method for computing magnitudes of quantized SU(2) Berry flux (spin-Chern number) from eigenvalues of Wilson loops. The power of this method is elucidated by performing N-classification of ab initio band structures of three-dimensional, Dirac materials. Our work outlines a unified framework for addressing first-order and higher-order topology of insulators and semimetals, without relying on detailed symmetry data.