Density of states of tight-binding models in the hyperbolic plane
Rémy Mosseri, Julien Vidal
Abstract
We study the energy spectrum of tight-binding Hamiltonians for regular hyperbolic tilings. More specifically, we compute the density of states using the continued-fraction expansion of the Green's function on finite-size systems with more than ${10}^{9}$ sites and open boundary conditions. The coefficients of this expansion are found to quickly converge, so that the thermodynamic limit can be inferred quite accurately. This density of states is in stark contrast with the prediction stemming from the recently proposed hyperbolic band theory. Thus we conclude that the fraction of the energy spectrum described by the hyperbolic Bloch-like wave eigenfunctions vanishes in the thermodynamic limit.
Topics & Concepts
EigenfunctionPhysicsLimit (mathematics)Thermodynamic limitDensity of statesBoundary (topology)Spectrum (functional analysis)Eigenvalues and eigenvectorsTight bindingFunction (biology)Boundary value problemQuantum mechanicsMathematical analysisMathematicsElectronic structureEvolutionary biologyBiologyQuantum chaos and dynamical systemsNonlinear Photonic SystemsCold Atom Physics and Bose-Einstein Condensates