▎ 摘　　要

We investigate the electronic structure induced by wedge disclinations (conical singularities) in a honeycomb lattice model realizing Chern numbers gamma = +/- 1. We establish a correspondence between the bound state of (i) an isolated Phi(0)/2 flux, (ii) an isolated pentagon (n = 1) or heptagon (n = -1) defect with an external flux of magnitude n gamma Phi(0)/4 through the center, and (iii) an isolated square or octagon defect without external flux, where Phi(0) = h/e is the flux quantum. Because of the above correspondence, the existence of isolated electronic states bound to disclinations is robust against various perturbations. Hence, measuring these defect states offers an interesting probe of graphene-based topological insulators which is complementary to measurements of the quantized edge currents. DOI: 10.1103/PhysRevLett.110.046401