Geometric bulk-edge correspondence for Z2-topological insulators

Abstract

Fermionic time-reversal-invariant insulators in two dimensions--class AII in the Kitaev table--come in two topological phases. These phases are characterized by a Z2-valued invariant, the Fu-Kane-Mele index. We prove a geometric bulk-edge correspondence for curved interfaces: if two such insulators occupy complementary regions separated by a curved boundary, then the Z2 edge index of the interface system is the product, modulo two, of the difference of the two bulk Z2 indices and a geometric intersection number associated with the boundary and the measurement region. The argument is a Z2 analogue of the curved-interface connection formula proved for Hall insulators in DZ24.