Litcius/Paper detail

Wave-function geometry of band crossing points in two dimensions

Yoonseok Hwang, Junseo Jung, Jun‐Won Rhim, Bohm‐Jung Yang

2021Physical review. B./Physical review. B29 citationsDOIOpen Access PDF

Abstract

Geometry of the wave function is a central pillar of modern solid state physics. In this work, we unveil the wave-function geometry of two-dimensional semimetals with band crossing points (BCPs). We show that the Berry phase of BCPs are governed by the quantum metric describing the infinitesimal distance between quantum states. For generic linear BCPs, we show that the corresponding Berry phase is determined either by an angular integral of the quantum metric, or equivalently, by the maximum quantum distance of Bloch states. This naturally explains the origin of the $\ensuremath{\pi}$-Berry phase of a linear BCP. In the case of quadratic BCPs, the Berry phase can take an arbitrary value between 0 and $2\ensuremath{\pi}$. We find simple relations between the Berry phase, maximum quantum distance, and the quantum metric in two cases: (i) when one of the two crossing bands is flat; (ii) when the system has rotation and/or time-reversal symmetries. To demonstrate the implication of the continuum model analysis in lattice systems, we study tight-binding Hamiltonians describing quadratic BCPs. We show that, when the Berry curvature is absent, a quadratic BCP with an arbitrary Berry phase always accompanies another quadratic BCP so that the total Berry phase of the periodic system becomes zero. This work demonstrates that the quantum metric plays a critical role in understanding the geometric properties of topological semimetals.

Topics & Concepts

Berry connection and curvatureGeometric phasePhysicsQuantum geometryWave functionQuantumLattice (music)Quantum stateQuantum mechanicsTopology (electrical circuits)GeometryMathematicsQuantum dynamicsQuantum operationCombinatoricsAcousticsTopological Materials and PhenomenaGraphene research and applicationsQuantum Mechanics and Non-Hermitian Physics