Topological aspects of quantum spin Hall effect in graphene: Z$_2$ topological order and spin Chern number
arXiv:cond-mat/0607484 · doi:10.1103/PhysRevB.75.121403
Abstract
For generic time-reversal invariant systems with spin-orbit couplings, we clarify a close relationship between the Z$_2$ topological order and the spin Chern number proposed by Kane and Mele and by Sheng {\it et al.}, respectively, in the quantum spin Hall effect. It turns out that a global gauge transformation connects different spin Chern numbers (even integers) modulo 4, which implies that the spin Chern number and the Z$_2$ topological order yield the same classification. We present a method of computing spin Chern numbers and demonstrate it in single and double plane of graphene.
5 pages, 3 figures