Litcius/Paper detail

Dirac cones and higher-order topology in quasi-continuous media

Zhi‐Kang Lin, Jian‐Hua Jiang

2022Europhysics Letters (EPL)13 citationsDOIOpen Access PDF

Abstract

Abstract We consider the Dirac cones and higher-order topological phases in quasi-continuous media of classical waves ( e.g. , photonic and sonic crystals). Using sonic crystals as prototype examples, we revisit some of the known systems in the study of topological acoustics. We show the emergence of various Dirac cones and higher-order topological band gaps in the same framework by tuning the geometry of the system. We provide a pedagogical review of the underlying physics and methodology via the bulk-edge-corner correspondence, symmetry-based indicators, Wannier representations, filling anomaly, and fractional corner charges. In particular, the theory of the Dirac cones and the higher-order topology are put in the same framework. These examples and the underlying physics principles can be inspiring and useful in the future study of higher-order topological metamaterials.

Topics & Concepts

Dirac (video compression format)MetamaterialTopology (electrical circuits)PhysicsOrder (exchange)PhotonicsTheoretical physicsQuantum mechanicsMathematicsFinanceCombinatoricsNeutrinoEconomicsTopological Materials and PhenomenaQuantum Mechanics and Non-Hermitian PhysicsMetamaterials and Metasurfaces Applications