Litcius/Paper detail

Crystalline responses for rotation-invariant higher-order topological insulators

Julian May-Mann, Taylor L. Hughes

2022Physical review. B./Physical review. B19 citationsDOIOpen Access PDF

Abstract

Two-dimensional higher-order topological insulators can display a number of exotic phenomena, such as half-integer charges localized at both corners and disclination defects. In this paper, we analyze these phenomena, focusing on the paradigmatic example of the quadrupole insulator with ${C}_{4}$ rotation symmetry, and present a topological field theory description of the mixed geometry-charge responses. Our theory provides a unified description of the corner and disclination charges in terms of a physical geometry (which encodes disclinations), and an effective geometry (which encodes corners). We extend this analysis to interacting systems, and predict the response of fractional quadrupole insulators, which exhibit charge $e/2(2k+1)$ bound to corners and disclinations.

Topics & Concepts

DisclinationPhysicsInvariant (physics)Charge (physics)Mirror symmetryTopological insulatorSymmetry (geometry)QuadrupoleTopological defectTopological quantum numberTopology (electrical circuits)GeometryInsulator (electricity)Rotation (mathematics)Theoretical physicsCondensed matter physicsQuantum mechanicsMathematicsLiquid crystalCombinatoricsOptoelectronicsTopological Materials and PhenomenaGraphene research and applicationsQuantum many-body systems