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Non-Abelian Hyperbolic Band Theory from Supercells

Patrick M. Lenggenhager, Joseph Maciejko, Tomáš Bzdušek

2023Physical Review Letters37 citationsDOIOpen Access PDF

Abstract

Wave functions on periodic lattices are commonly described by Bloch band theory. Besides Abelian Bloch states labeled by a momentum vector, hyperbolic lattices support non-Abelian Bloch states that have so far eluded analytical treatments. By adapting the solid-state-physics notions of supercells and zone folding, we devise a method for the systematic construction of non-Abelian Bloch states. The method applies Abelian band theory to sequences of supercells, recursively built as symmetric aggregates of smaller cells, and enables a rapidly convergent computation of bulk spectra and eigenstates for both gapless and gapped tight-binding models. Our supercell method provides an efficient means of approximating the thermodynamic limit and marks a pivotal step toward a complete band-theoretic characterization of hyperbolic lattices.

Topics & Concepts

Bloch wavePhysicsAbelian groupSupercellEigenvalues and eigenvectorsGapless playbackQuantum mechanicsTheoretical physicsCondensed matter physicsPure mathematicsMathematicsThunderstormMeteorologyTopological Materials and PhenomenaGraphene research and applicationsQuantum and electron transport phenomena
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