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Optical lattices for ultracold atomic gases. Andrea Trombettoni (SISSA, Trieste). Sestri Levante, 9 June 2009. Outlook A brief introduction on ultracold atoms Why using optical lattices? Effective tuning of the interactions Experimental realization of interacting lattice Hamiltonians
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Optical lattices for ultracold atomic gases Andrea Trombettoni (SISSA, Trieste) Sestri Levante, 9 June 2009
Outlook • A brief introduction on ultracold atoms • Why using optical lattices? • Effective tuning of the interactions • Experimental realization of interacting lattice Hamiltonians • Ultracold bosons on a disordered lattice: the shift of the critical temperature
Trapped ultracold atoms: Bosons • System: • - typically alkali gases (e.g., Rb or Li) • temperature order of 10-100 nK • number of particles: 103-106 • size order of 1-100 mm Bose-Einstein condensation of a dilute bosonic gas Probe of superfluidity: vortices
Trapped ultracold atoms: Fermions A non-interacting Fermi gas Tuning the interactions… … and inducing a fermionic “condensate”
Ultracold atoms in an optical lattice a 3D lattice • It is possible to control: • - barrier height • interaction term • the shape of the network • the dimensionality (1D, 2D, …) • the tunneling among planes or among tubes • (in order to have a layered structure) • …
Tuning the interactions with optical lattices s-wave scattering length bosonic field tight-binding Ansatz [Jaksch et al. PRL (1998)] For large enough barrier height Bose-Hubbard Hamiltonian increasing the scattering length or increasing the barrier height the ratio U/t increases Ultracold fermions in an optical lattice (Fermi-)Hubbard Hamiltonian [Hofstetter et al., PRL (2002) – Chin et al., Nature (2006)]
Why using optical lattices? • Effective tuning of the interactions • Nonlinear discrete dynamics: negative mass, solitons, dynamical instabilities • Experimental realization of interacting lattice Hamiltonians: Study of quantum & finite temperature phase transitions Quantum phase transitions in bosonic arrays Increasing V, one passes from a superfluid to a Mott insulator [Greiner et al., Nature (2001)] Similar phase transitions studied in superconducting arrays [see Fazio and van der Zant, Phys. Rep. 2001]:
Finite temperature Berezinskii-Kosterlitz-Thouless transition in a 2D lattice thermally driven vortex proliferation central peak of the momentum distribution: Good description at finite T by an XY model [Schweikhard et al.,PRL (2007)] In the continuous 2D Bose gas BKT transition observed in the Dalibard group in Paris, see Hadzibabibc et al., Nature (2006) [A. Trombettoni, A. Smerzi and P. Sodano, New J. Phys. (2005)]
2D optical lattices “simulating” graphene With three lasers suitably placed: Zhu, Wang and Duan, PRL (2007)
Trapped ultracold atoms Ultracold bosons and/or fermions in trapping potentials provide new experimentally realizable interacting systems on which to test well-known paradigms of the statistical mechanics: -) in a periodic potential -> strongly interacting lattice systems -) interaction can be enhanced/tuned through Feshbach resonances (BEC-BCS crossover – unitary limit) -) inhomogeneity can be tailored – defects/impurities can be added -) effects of the nonlinear interactions on the dynamics -) strong analogies with superconducting and superfluid systems -) used to study 2D physics -) predicted a Laughlin ground-state for 2D bosons in rotation: anyionic excitations …
Outlook • A briefintroduction on ultracoldatoms • Whyusingopticallattices? • Effectivetuningof the interactions • Experimentalrealizationofinteracting lattice Hamiltonians • Ultracoldbosons on a disordered lattice: the shiftof the critical temperature • Infinite-rangemodel: dTc<0, and vanishingdTcforlargefilling f • 3D lattice: orderedlimit & connection with the sphericalmodel • 3D lattice withdisorder: dTc>0 forlarge f - dTc<0 forsmall f • with: • L. Dell’Anna, S. Fantoni (SISSA), P. Sodano (Perugia) • [J. Stat. Mech. P11012 (2008)]
Bosons on a lattice with disorder total number of particles filling number of sites random variables: produced by a speckle or by an incommensurate bichromatic lattice From the replicated action disorder is similar to an attractive interaction
Replicated action Introducing N replicas (a=1,…,N) effective attraction
Shift of the critical temperature in a continuous Bose gas due to the repulsion For an ideal Bose gas, the Bose-Einstein critical temperature is What happens if a repulsive interaction is present? The critical temperature increases for a small (repulsive) interaction… …and finally decreases [see Blaizot, arXiv:0801.0009]
Long-range limit (I) Without random-bond disorder The relation between the number of particles and the chemical potential is The critical temperature is then
Long-range limit (II) With random-bond disorder Using results from the theory of random matrices [in agreement with the results for the spherical spin glass by Kosterlitz, Thouless, and Jones, PRL (1976)]
3D lattice without disorder single particle energies The relation between the number of particles and the chemical potential is For large filling
3D lattice with disorder 3D lattice, with random-bond and on-site disorder: • Introducing N replicas of the system and computing the effective replicated action • Disorder (both on links and on-sites) is equivalent to an effective • attraction among replicas • Diagram expansion for the Green’s functions for N 0 • Computing the self-energy • New chemical potential (effective t larger, larger density of states)
3D lattice with disorder: Results for random-bond disorder For large filling When both random-bond and random on-site disorder are present
3D lattice with disorder: numerical results results for the continuous (i.e., no optical lattice) Bose gas [Vinokur & Lopatin, PRL (2002)]
A (very) qualitative explanation Continuous Bose gas: Repulsion critical temp. Tc increases Disorder “attraction” Tcdecreases Lattice Bose gas: Disorder “attraction” Small filling continuous limit Tcdecreases Large filling all the band is occupied effective “repulsion” Tcincreases
Some details on the diagrammatic expansion (I) Green’s functions: N -> 0 At first order in v02
Some details on the diagrammatic expansion (II)
Connection with the spherical model The ideal Bose gas is in the same universality class of the spherical model [Gunton-Buckingham, PRL (1968)] For large filling, the critical temperature coincides with the critical temperature of the spherical model with the (generalized) constraint
Long-range limit (I) Without random-bond disorder The matrix to diagonalize is where The relation between the number of particles and the chemical potential is The critical temperature is then
3D lattice with disorder: Results for an incommensurate potential Two lattices:
Stabilization of solitons by an optical lattice (I) Recent proposals to engineer 3-body interactions [Paredes et al., PRA 2007 -Buchler et al., Nature Pysics 2007] In 1D with attractive 3-body contact interactions: no Bethe solution is available – in mean-field [Fersino et al., PRA 2008]: in order to have a finite energy per particle
Stabilization of solitons by an optical lattice (II) Problem: a small (residual) 2-body interaction make unstable such soliton solutions Adding an optical lattice : Soliton solutions stable for for small q
2-Body Contact Interactions N=2 Lieb-Liniger model it is integrable and the ground-state energy E can be determined by Bethe ansatz: Mean-field works for [3]: is the ground-state of the nonlinear Schrodinger equation in order to have a finite energy per particle with energy [3] F. Calogero and A. Degasperis, Phys. Rev. A11, 265 (1975)
N-Body Attractive Contact Interactions We consider an effective attractive 3-body contact interaction and, more generally, an N-body contact interaction: contact interaction N-body attractive (c>0) With
