dirac- microwave billiards , photonic crystals and graphene
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Dirac- Microwave Billiards , Photonic Crystals and Graphene. Warsaw 2013. Graphene , Schrödinger-microwave billiards and photonic crystals Band structure and relativistic H amiltonian Dirac-microwave billiards Spectral properties Periodic orbits Edge states - PowerPoint PPT PresentationTRANSCRIPT
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Dirac-Microwave Billiards, Photonic Crystals and Graphene
Supported by DFG within SFB 634
S. Bittner, C. Cuno, B. Dietz, T. Klaus, M. Masi, M. Miski-Oglu, A. R., F.Iachello, N. Pietralla, L. von Smekal, J. Wambach
Warsaw 2013
2013 | Institute of Nuclear Physics | SFB 634 | Achim Richter | 1
• Graphene, Schrödinger-microwave billiards and photonic crystals • Band structure and relativistic Hamiltonian• Dirac-microwave billiards• Spectral properties• Periodic orbits• Edge states• Quantum phase transitions• Outlook
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Graphene
Two triangular sublattices of carbon atoms Near each corner of the first hexagonal Brillouin zone the electron
energy E has a conical dependence on the quasimomentum but low Experimental realization of graphene in analog experiments of microwave
photonic crystals
• “What makes graphene so attractive for research is that the spectrum closely resembles the Dirac spectrum for massless fermions.”M. Katsnelson, Materials Today, 2007
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conductionband
valenceband
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Closed Flat Microwave Billiards: Model Systems for Quantum Phenomena
xyz
zeyxErEdcff
),()(
2max
0),(,0),(2 GyxEyxEk
scalar Helmholtz equation Schrödinger equation for quantum billiards
cf
krErEk G
2
,0)(n,0)(2 vectorial
Helmholtz equation
cylindrical resonators
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Open Flat Microwave Billiard:Photonic Crystal
• A photonic crystal is a structure, whose electromagnetic properties vary periodically in space, e.g. an array of metallic cylinders→ open microwave resonator
• Flat “crystal” (resonator) → E-field is perpendicular to the plates (TM0 mode)• Propagating modes are solutions of the scalar Helmholtz equation
→ Schrödinger equation for a quantum multiple-scattering problem→ Numerical solution yields the band structure
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Calculated Photonic Band Structure
Dispersion relation of a photonic crystal exhibits a band structure analogous to the electronic band structure in a solid
The triangular photonic crystal possesses a conical dispersion relation → Dirac spectrum with a Dirac point where bands touch each other
conductionband
valenceband
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Effective Hamiltonian around Dirac Point
• Close to Dirac point the effective Hamiltonian is a 2x2 matrix
• Substitution and leads to the Dirac equation
• Experimental observation of a Dirac spectrum in open photonic crystalS. Bittner et al., PRB 82, 014301 (2010)
• Next: experimental realization of a relativistic billiard
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Microwave Dirac Billiard: Photonic Crystal in a Box→ “Artificial Graphene“
• Graphene flake: the electron cannot escape → Dirac billiard • Photonic crystal: electromagnetic waves can escape from it
→ microwave Dirac billiard: “Artificial Graphene“• Relativistic massless spin-one half particles in a billiard
(Berry and Mondragon,1987)
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Zigzag edge
Arm
chai
r edg
e
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Microwave Dirac Billiards with and without Translational Symmetry
• Boundaries of B1 do not violate the translational symmetry → cover the plane with perfect crystal lattice
• Boundaries of B2 violate the translational symmetry→ edge states along the zigzag boundary
• Almost the same area for B1 and B2
billiard B2billiard B1
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Superconducting Dirac Billiard with Translational Symmetry
• The Dirac billiard is milled out of a brass plate and lead plated• 888 cylinders• Height h = 3 mm fmax = 50 GHz for 2D system• Lead coating is superconducting below 7.2 K high Q value • Boundary does not violate the translational symmetry no edge states
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• Measured S-matrix: |S21|2=P2 / P1
• Quality factors > 5∙105
• Altogether 5000 resonances observed• Pronounced stop bands and Dirac points
Transmission Spectrum at 4 K
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Density of States of the Measured Spectrum and the Band Structure
• Positions of stop bands are in agreement with calculation
• DOS related to slope of a band• Dips correspond to Dirac points• High DOS at van Hove
singularities ESQPT?• Flat band has very high DOS• Qualitatively in good agreement
with prediction for graphene
(Castro Neto et al., RMP 81,109 (2009))
• Oscilations around the mean density finite size effect
stop band
stop band
stop band
Dirac point
Dirac point
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• Level density
• Dirac point • Van Hove singularities of the bulk states • Next: TBM description of experimental DOS
Tight-Binding Model (TBM) for ExperimentalDensity of States (DOS)
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Tight Binding Description of the Photonic Crystal• The voids in a photonic crystal form a honeycomb lattice
• resonance frequency of an “isolated“ void• nearest neighbour contribution t1
• next nearest neighbour contribution t2
• second-nearest neighbour contribution t3
• Here the overlap is neglected
t1
t3t2
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Fit of the Tight-Binding Model to Experiment
Numerical solution of Helmholtz equation
• Fit of the tight-binding model to the experimental frequencies , , yields the unknown coupling parameters f0,t1,t2,t3
ExperimentalDOS
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Fit of the TBM to Experiment
obvious deviations good agreement
• Fluctuation properties of spectra
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Schrödinger and Dirac Dispersion Relation in the Photonic Crystal
Dirac regimeSchrödinger regime
• Dispersion relation along irreducible Brillouin zone
• Quadratic dispersion around the point Schrödinger regime
• Linear dispersion around the point Dirac regime
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Integrated Density of States
• Schrödinger regime: with w , where m is the “effective mass“ discribing the parabolic dispersion
• Dirac Regime: with , where is the group velocity at the Dirac frequency
• Unfolding is necessary in order to obtain the length spectra
Schrödinger regime
Dirac regime
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Integrated DOS near Dirac Point
• Weyl’s law for Dirac billiard: (J. Wurm et al., PRB 84, 075468 (2011))
•
• group velocity is a free parameter
• Same area A for two branches, but different group velocities electron-hole asymmetry like in graphene (different opening angles of the upper and lower cone)
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Spectral Properties of a Rectangular Dirac Billiard: Nearest Neighbour Spacing Distribution
• 159 levels around Dirac point• Rescaled resonance frequencies such that • Poisson statistics• Similar behavior in the Schrödinger regime
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Periodic Orbit Theory (POT)Gutzwiller‘s Trace Formula
• Description of quantum spectra in terms of classical periodic orbits
Periodic orbits
spectrum spectral density
Peaks at the lengths l of PO’s
wavenumbers length spectrum
FT
Dirac billiard
Effective description
around the Dirac point
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Experimental Length Spectrum:Schrödinger regime
• Very good agreement
• Next: Dirac regime
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Experimental Length Spectrum:Around the Dirac Point
• Some peak positions deviate from the
lengths of POs
• Comparison with semiclassical predictions
for a relativistic Dirac billiard
(J. Wurm et al., PRB 84, 075468 (2011))
• Possible reasons for deviations:
- Short sequence of levels (80 levels only)
- Anisotropic dispersion relation
around the Dirac point (trigonal
warping, i.e. deformation of the Dirac
cone)2013 | Institute of Nuclear Physics | SFB 634 | Achim Richter | 22
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Superconducting Dirac Billiard without Translational Symmetry
• Boundaries violate the translational symmetry edge states
• Additional antennas close to the boundary
Zigzag edge
Arm
chai
r edg
e
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Transmission Spectra of B1 and B2 around the Dirac Frequency
• Accumulation of resonances above the Dirac frequency
• Resonance amplitude is proportional to the product of field strengths at
the position of the antennas detection of localized states2013 | Institute of Nuclear Physics | SFB 634 | Achim Richter | 24
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Comparison of Spectra Measured with Different Antenna Combinations
• Modes living in the inner part (black lines)• Modes localized at the edge (red lines) have higher amplitudes
Antenna positions
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Smoothed Experimental Density of States
• Clear evidence of the edge states
• Position of the peak for the edge states deviates from the theoretical
prediction (K. Sasaki, S. Murakami, R. Saito (2006))
• Modification of tight-binding model including the overlap is needed
2013 | Institute of Nuclear Physics | SFB 634 | Achim Richter | 26
TB p
redi
ctio
n
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Summary I
• Measured the DOS in a superconducting Dirac billiard with high resolution
• Observation of two Dirac points and associated van Hove singularities:
qualitative agreement with the band structure for graphene
• Description of the experimental DOS with a Tight-Binding Model yields
perfect agreement
• Fluctuation properties of the spectrum agree with Poisson statistics
• Evaluated the length spectra of periodic orbits around and away from the
Dirac point and made a comparison with semiclassical predictions
• Edge states are detected in the spectra
• Outlook: Do we see quantum phase transitions?
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• Experimental density of states in the Dirac billiard
• Features of the DOS related to the topology of the isofrequency lines in k-space
• Van Hove singularities at saddle point: density of states diverges logarithmically for quasimomenta near the M point
• Topological phase transition
Spectroscopic Features of the DOS in a Dirac Billiard
saddle point
saddle point
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Why is this a Topological Phase Transition?
phase transitionin two dimensions
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• Consider real graphene with tunable Fermi energies, i.e. variable chemical potential → topology of the Fermi surface changes with
• Disruption of the “neck“ of the Fermi surface• This is called a Lifshitz topological phase transition with as a control
parameter (Lifshitz 1960)
• What happens when is close to the Van Hove singularity?
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Finite-Size Scaling of DOS at the Van Hove Singularities
• TBM for infinitely large crystal yields
• Logarithmic behaviour as seen in
- transverse vibration of a hexagonal lattice (Hobson and Nierenberg, 1952)
- vibrations of molecules (Pèrez-Bernal, Iachello, 2008)
- two-level fermionic and bosonic pairing models (Caprio, Scrabacz, Iachello, 2011)
• Finite size photonic crystals or graphene flakes formed by hexagons
, i.e. logarithmic scaling of the VH peak
determined using Dirac billiards of varying size:
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DOS, Static Susceptibility and Particle-Hole Excitations: Lindhard Function
• Polarization of the medium by a photon → bubble diagram
• Summation over all momenta of virtual electron-hole pairs → Lindhard function
• Static susceptibility defined as
• It can be shown within the tight-binding approximation that , i.e. evolves as function of the chemical potential like the DOS→ logarithmic divergence at (Van Hove singularity)
• Divergence of at caused by the infinite degeneracy of ground state: ground state QPT
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Spectral Distribution of Particle-Hole Excitations
• Spectral distribution of the particle-hole excitations
• Same logarithmic behavior as for the ground-state observed for the excited states: ESQPT
• Logarithmic singularity separates the relativistic excitations from the nonrelativistic ones
Diracregime
Schrödingerregime
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• ”Artificial” Fullerene
• Understanding of the measured spectrum in terms of TBM
• Superconducting quantum graphs
• Test of quantum chaotic scattering predictions(Pluhař + Weidenmüller 2013)
200
mm
Outlook
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50 m
m