Generalization of Chiral Symmetry for Tilted Dirac Cones
arXiv:1201.5175 · doi:10.1142/S2010194512006046
Abstract
The notion of chiral symmetry for the conventional Dirac cone is generalized to include the tilted Dirac cones, where the generalized chiral operator turns out to be non-hermitian. It is shown that the generalized chiral symmetry generically protects the zero modes (n=0 Landau level) of the Dirac cone even when tilted. The present generalized symmetry is equivalent to the condition that the Dirac Hamiltonian is elliptic as a differential operator, which provides an explicit relevance to the index theorem.
4 pages, 1 figure, to appear in the proceedings of the APCTP Conference on Localisation 2011