Group Structure of Wilson Loops in 2D Models with 2- and 4-Band Energy Spectra

Abstract

We consider a tight-binding model defined by a matrix Hamiltonian over 2D Brillouin zone. Multiband energy spectrum gives rise to a non-Abelian gauge structure set by the Berry connections. The corresponding curvature Fμ vanishes throughout the Brillouin zone except an isolated points where Fμ is singular. Combining the singular behaviour of Fμ with non-Abelian Stokes theorem allows to avoid the path ordering procedure in studying the structure of Wilson loops. 2D models with 2-band and 4-band energy spectra are considered as a demonstrative examples and the group structure of the corresponding Wilson loops is revealed.