The Stiefel--Whitney theory of topological insulators

Abstract

We study the topological band theory of time reversal invariant topological insulators and interpret the topological Z2 invariant as an obstruction in terms of Stiefel--Whitney classes. The band structure of a topological insulator defines a Pfaffian line bundle over the momentum space, whose structure group can be reduced to Z2. So the topological Z2 invariant will be understood by the Stiefel--Whitney theory, which detects the orientability of a principal Z2-bundle. Moreover, the relation between weak and strong topological insulators will be understood based on cobordism theory. Finally, the topological Z2 invariant gives rise to a fully extended topological quantum field theory (TQFT).