Topological properties of spin-triplet superconductors and the Fermi surface topology in the normal state
arXiv:0806.0426 · doi:10.1103/PhysRevB.79.214526
Abstract
We report intimate relations between topological properties of full gapped spin-triplet superconductors with time-reversal invariance and the Fermi surface topology in the normal states. An efficient method to calculate the Z2 invariants and the winding number for the spin-triplet superconductors is developed, and connections between these topological invariants and the Fermi surface structures in the normal states are pointed out. We also obtain a correspondence between the Fermi surface topology and gapless surface states in the superconducting states. The correspondence is inherent to spin-triplet superconductivity.
14 pages, 2 figures, 1 table, a table was added