Novel orbital physics with cold atoms in optical lattices
description
Transcript of Novel orbital physics with cold atoms in optical lattices
Novel orbital physics with cold atoms in optical lattices
Congjun Wu
Department of Physics, UC San Diego
C. Wu, arXiv:0805.3525, to appear in PRL.Shizhong Zhang and C. Wu, arXiv:0805.3031.V. M. Stojanovic, C. Wu, W. V. Liu and S. Das Sarma, PRL 101, 125301(2008). C. Wu, PRL 100, 200406 (2008). C. Wu, and S. Das Sarma, PRB 77, 235107 (2008).C. Wu, D. Bergman, L. Balents, and S. Das Sarma, PRL 99, 67004(2007).C. Wu, W. V. Liu, J. Moore and S. Das Sarma, PRL 97, 190406 (2006).W. V. Liu and C. Wu, PRA 74, 13607 (2006).
Oct 22, 2008, UCLA.
Collaborators L. Balents UCSB
Many thanks to I. Bloch, L. M. Duan, T. L. Ho, Z. Nussinov, S. C. Zhang for helpful discussions.
D. Bergman Yale
W. V. Liu Univ. of Pittsburg
S. Das Sarma Univ. of Maryland
J. Moore Berkeley
Shi-zhong Zhang UIUC
W. C. Lee, H. H. Hung UCSD
I. Mondragon Shem
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Outline
• Introduction to orbital physics.
• Bosons: exotic condensate, complex-superfluidity breaking time-reversal symmetry.
New directions of cold atoms: orbital physics in high-orbital bands; pioneering experiments.
• Fermions: px,y-orbital counterpart of graphene, flat bands and non-perturbative effects
• Orbital exchange, frustrations, order from disorder, orbital liquid?.
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M. H. Anderson et al., Science 269, 198 (1995)
Bose-Einstein condensation
314cm10~1~ nKTBEC
• Bosons in magnetic traps: dilute and weakly interacting systems.
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New era of cold atom physics: optical lattices
• Strongly correlated systems.
• Interaction effects are tunable by varying laser intensity.
U
tt : inter-site tunnelingU: on-site interaction
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Superfluid-Mott insulator transition
Superfluid
Greiner et al., Nature (2001).
Rb87
Mott insulator
t<<Ut>>U
Research focuses of cold atom physics
• Great success of cold atom physics in the past decade:BEC,
superfluid-Mott insulator transition,
fermion superfluidity and BEC-BCS crossover … …
• New focus: novel strong correlation phenomena which are NOT easily accessible in solid state systems. • New physics of bosons and fermions in high-orbital bands.
Good timing: pioneering experiments; square lattice (Mainz); double well lattice (NIST); quasi 1D polariton lattice (stanford).J. J. Sebby-Strabley, et al., PRA 73, 33605 (2006); T. Mueller et al., Phys. Rev. Lett. 99, 200405 (2007); C. W. Lai et al., Nature 450, 529 (2007).
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Orbital physics
• Orbital band degeneracy and spatial anisotropy.
• cf. transition metal oxides (d-orbital bands with electrons).
La1-xSr1+xMnO4
• Orbital: a degree of freedom independent of charge and spin.Tokura, et al., science 288, 462,
(2000).
LaOFeAs
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Advantages of optical lattice orbital system
tt//
• Optical lattices orbital systems:
rigid lattice free of distortion;
both bosons (meta-stable excited states with long life time) and fermions;
strongly correlated px,y-orbitals: stronger anisotropy
-bond -bond
• Solid state orbital systems:
Jahn-Teller distortion quenches orbital degree of freedom;
only fermions;
correlation effects in p-orbitals are weak.
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Pumping bosons by Raman transition
T. Mueller, I. Bloch et al., Phys. Rev. Lett. 99, 200405 (2007).
• Quasi-1d feature in the square lattice.
• Long life-time: phase coherence.
xpyp
Lattice polariton condensation in the p-orbital C. W. Lai et al, Nature 450, 529 (2007)
• Quasi 1D polariton lattice by deposing metallic strips.
• Condensates at both s-orbital (k=0) and p-orbital (k=) states.
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Outline
• Introduction.
• Bosons: complex-superfluidity breaking time-reversal symmetry. New condensates different from Feynman’s argument of the positive-definitiveness of ground state wavefunctions.
C. Wu, W. V. Liu, J. Moore and S. Das Sarma, PRL 97, 190406 (2006).W. V. Liu and C. Wu, PRA 74, 13607 (2006).Other group’s related work: V. W. Scarola et. al, PRL, 2005; A. Isacsson et. al., PRA 2005; A. B. Kuklov, PRL 97, 2006; C. Xu et al., cond-mat/0611620 .
• Fermions: px,y-orbital counterpart of graphene, flat bands and non-perturbative effects
• Orbital exchange, frustrations, order from disorder, orbital liquid?.
Feynman’s celebrated argument • The many-body ground state wavefunctions (WF) of boson systems in the coordinate-representation are positive-definite in the absence of rotation.
0),...,( 21 nrrr),...,( 21 nrrr |),...,(| 21 nrrr
• Strong constraint: complex-valued WF positive definite WF; time-reversal symmetry cannot be broken.
)(|),..(|
)(|),..(||),...(|2
...
int2
1
1
21
21
1
2
1
jiji
n
n
iiexnni
n
in
rrVrr
rUrrrrm
drdrH
• Feynman’s statement applies to all of superfluid, Mott-insulating, super-solid, density-wave ground states, etc.
New states of bosons beyond Feynman’s argument
Solution 1: Excited (meta-stable) states of bosons: bosons in higher orbital bands ---- orbital physics of bosons.
• How to bypass this argument to obtain complex-valued many-body wavefunctions of bosons and spontaneous breaking of time-reversal symmetry?
Solution 2: Feynman’s argument does not apply to Hamiltonians linearly dependent on momentum.
Ground states of spinful bosons with spin-orbit coupling (e.g. excitons).
C. Wu and I. Mondragon-Shem, ariXiv:0809.3532.
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Ferro-orbital interaction for spinless p-orbital bosons
4|)(| rdrgU x
• A single site problem: two orbitals px and py with two spinless bosons.
0|)(2
1
0}2
)(2
1{:2
2yx
yxyyxxz
ipp
ppi
ppppL
0)(2
1:0 yyxxz ppppL
polar
UE
3
40
11i
i
axial
UE3
22
)()( 2121 rrgrrV
02 EE
22 yx
2)( iyx
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Orbital Hund’s rule for p-orbital spinless bosons
11i
i
11 polar
axial
• Axial states (e.g. p+ip) are spatially more extended than polar states (e.g. px or py).
• cf. Hund’s for electrons; p+ip superconductors.
• Bosons go into one axial state to save repulsive interaction energy, thus maximizing orbital angular momentum.
)(,
})(3
1{
222
int
xyyxzyyxx
zr
rr
ppppiLppppn
LnU
H
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“Complex” superfluidity with time-reversal symmetry breaking
• Staggered ordering of orbital angular momentum moment in the square lattice.
• Time of flight (zero temperature): Bragg peaks located at fractional values of reciprocal lattice vectors.
i
i11
i11
i
11i
i11
i
i
//t
t
W. V. Liu and C. Wu, PRA 74, 13607 (2006).
)0,)((2
1
am
))(,0(
2
1
an
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“Complex” superfluidity with time-reversal symmetry breaking
• Stripe ordering of orbital angular momentum moment in the triangular lattice.
• Each site behaves like a vortex with long range interaction in the superfluid state. Stripe ordering to minimize the global vorticity.
C. Wu, W. V. Liu, J. Moore and S. Das Sarma, Phy. Rev. Lett. 97, 190406 (2006).
i
i11
i
i11
1
1
ii
i
i11
1
1ii
1
1ii
1
1
ii
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Strong coupling analysis
)( 3216
1
,,2
1
'
' rrr
rrrri A
1r
2r
3r
6
1i
i11
i
i11
1
1ii
• cf. The same analysis also applies to p+ip Josephson junction array.
• The minimum of the effective flux per plaquette is .
• The stripe pattern minimizes the ground state vorticity.
6/1
• Ising variable for vortex vorticity: 1
1 1 1
1
1
6
1
6
1
13
1
1
1
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Staggered plaquette orbital moment
cf. d-density-wave state in high Tc cuprate:
Sudip Chakravarty, R. B. Laughlin, Dirk K. Morr, and Chetan Nayak, Phys. Rev. B 63, 094503 (2001)
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3
1
2
Digression: Exciton with Rashba SO coupling in 2D quantum well
• Excitons: bound states of electrons and holes (heavy). Effective bosons at low densities below the Mott-limit.
2
3, zhhj
2
1zS
• The SO coupling still survives in the center-of-mass motion. Let us consider the sector with fixed heavy hole spin.
)(),(2
3,
2
3, hehe Kramer
doublet:
**
* ,/
hhe
eRR
mmM
Mm
2)(
)}(2
{22
2
gii
rVM
rdH
yxxyR
exEX
Ground state condensates: Kramer doublet
• A harmonic trap:
• Half-quantum vortex and spin skyrmion texture configuration in the strong SO coupling limit.
222
1)( rMrV Tex
,)(
)(,
)(
)(2/12/1
i
i
erg
rf
rf
erg
)/( TMl
2
1 SLjz
• SO length scale: )/(/1 0 RMk
40 lk
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Outline
• Introduction.
• Bosons: Complex-superfluidity beyond Feynman’s argument.
• Fermions: px,y-orbital counterpart of graphene, flat bands and non-perturbative effects.
Shizhong Zhang and C. Wu, arXiv:0805.3031.C. Wu, and S. Das Sarma, PRB 77, 235107 (2008).C. Wu, D. Bergman, L. Balents, and S. Das Sarma, PRL 99, 67004(2007).
• Orbital exchange, frustrations, order from disorder, orbital liquid?.
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pxy-orbital: flat bands; interaction effects dominate.
p-orbital fermions in honeycomb lattices
C. Wu, D. Bergman, L. Balents, and S. Das Sarma, PRL 99, 70401 (2007).
cf. graphene: a surge of research interest; pz-orbital; Dirac cones.
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px, py orbital physics: why optical lattices?
• pz-orbital band is not a good system for orbital physics.
• However, in graphene, 2px and 2py are close to 2s, thus strong hybridization occurs.
• In optical lattices, px and py-orbital bands are well separated from s.
• Interesting orbital physics in the px, py-orbital bands.
isotropic within 2D; non-degenerate.
1s
2s
2p1/r-like potential
s
p
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Honeycomb optical lattice with phase stability
• Three coherent laser beams polarizing in the z-direction.
G. Grynberg et al., Phys. Rev. Lett. 70, 2249 (1993).
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Artificial graphene in optical lattices
].)ˆ()([
].)ˆ()([
.].)ˆ()([
333
212
111//
cherprp
cherprp
cherprptHAr
t
• Band Hamiltonian (-bonding) for spin- polarized fermions.
1p2p
3p
yx ppp2
1
2
31
yx ppp2
1
2
32
ypp 3
1e2e
3e
A
B B
B
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• If -bonding is included, the flat bands acquire small width at the order of . Realistic band structures show
Flat bands in the entire Brillouin zone!
• Flat band + Dirac cone.
• localized eigenstates.
t
-bond
tt//
%1/ // tt
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Realistic Band structure with the sinusoidal optical potential
3~1
22
)cos(2 i
i rpVm
H
s-orbital bands
px,y-orbital bands
• Excellent band flatness.
Hubbard model for spinless fermions: Exact solution: Wigner crystallization in
Hubbard
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1n • Particle statistics is irrelevant. The result is also good for bosons.
• Close-packed hexagons; avoiding repulsion.
• The crystalline ordered state is stable even with small . t
gapped state
)()(,
int rnrnUHyx p
BArp
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Orbital ordering with strong repulsions
10/ // tU
2
1n
• Various orbital ordering insulating states at commensurate fillings.
• Dimerization at <n>=1/2! Each dimer is an entangled state of empty and occupied states.
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Flat-band ferromagnetism (FM) • FM requires strong repulsion to overcome kinetic energy cost, and thus has no well-defined weak coupling picture.
• We propose the realistic flat-band ferromagnetism in the p-orbital honeycomb lattices.
• Interaction amplified by the divergence of DOS. Realization of FM with weak repulsive interactions in cold atom systems.
• Hubbard-type models cannot give FM unless with the flat band structure. However, flat band models suffer the stringent condition of fine-tuned long range hopping, thus are difficult to realize.
• In spite of its importance, FM has not been paid much attention in cold atom community because strong repulsive interaction renders system unstable to the dimer-molecule formation.
Shizhong Zhang and C. Wu, arXiv:0805.3031; .
A. Mielke and H. Tasaki, Comm. Mat. Phys 158, 341 (1993).
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Outline
• Introduction.
• Bosons: new states of matter beyond Feynman’s argument of the positive-definitiveness of ground state wavefunctions.
Complex-superfluidity breaking time-reversal symmetry. • Fermions: px,y-orbital counterpart of graphene, flat bands and non-perturbative effects
• Orbital exchange and frustrations, order from disorder; orbital liquid?
C. Wu, PRL 100, 200406 (2008).
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Mott-insulators with orbital degrees of freedom: orbital exchange of spinless fermion
• Pseudo-spin representation.
)(2
11 yyxx pppp )(
2
12 xyyx pppp )(
23 xyyxi pppp
• No orbital-flip process. Exchange is antiferro-orbital Ising.
UtJ /2 2
)ˆ()( 11 xrrJH ex 0J
0J
UtJ /2 2
• For a bond along the general direction .
xp : eigen-states of yxe 2sin2cosˆ2
e
2e
)ˆ)ˆ()(ˆ)(( 22 eererJH ex
Hexagon lattice: quantum model 120
)ˆ)(()ˆ)((,
ijjijirr
ex ererJH
• After a suitable transformation, the Ising quantization axes can be chosen just as the three bond orientation.
A B
B
B
11 ))(( 22
312
122
312
1
))(( 22
312
122
312
1
yp
yx pp ,
• cf. Kitaev model.
))()()()(
)()((
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1
errerr
errJH
zzyy
xxr
kitaev
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Large S picture: heavy-degeneracy of classic ground states
• Ground state constraint: the two -vectors have the same projection along the bond orientation.
or r
zirr
ex rJerrJH )(}ˆ)]()({[( 22
,
• Ferro-orbital configurations.
• Oriented loop config: -vectors along the tangential directions.
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Global rotation degree of freedom
• Each loop config remains in the ground state manifold by a suitable arrangement of clockwise/anticlockwise rotation patterns.
• Starting from an oriented loop config with fixed loop locations but an arbitrary chirality distribution, we arrive at the same unoriented loop config by performing rotations with angles of .
150,90,30
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“Order from disorder”: 1/S orbital-wave correction
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Zero energy flat band orbital fluctuations
42 )(6 JSE
• Each un-oriented loop has a local zero energy model up to the quadratic level.
• The above config. contains the maximal number of loops, thus is selected by quantum fluctuations at the 1/S level.
• Project under investigation: the quantum limit (s=1/2)? A very promising system to arrive at orbital liquid state?
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Summary
1
1ii
1
1
ii
11
i
i
1
1ii
1
1
ii
11
i
i1 1
i
i
Orbital Hund’s rule and complex superfludity of spinless bosons
px,y-orbital counterpart of graphene: flat band and Wigner crystalization.
Orbital frustration.
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More work
• Orbital analogue of anomalous quantum Hall effect – topological insulators in the p- band.
C. Wu, arXiv:0805.3525, to appear in PRL.
• Incommensurate superfluidity in the double-well lattice of NIST.V. M. Stojanovic, C. Wu, W. V. Liu and S. Das Sarma, PRL 101, 125301 (2008).