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Disordering of a quantum Hall superfluid M.V. Milovanovic, Institute of Physics, Belgrade, Serbia
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The quantum Hall bilayer A fundamental problem of: Superfluid disordering in 2+1 dimensions!
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d (distance between layers) small Superfluid Appropriate quasiparticles CBs (composite bosons) Th: Wen and Zee,PRL 69, 1811(1992) …, Exp: Spielman et al., PRL 84, 5808 (2000)…
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Theory of Moon et al. PRB 51, 5138 (1995) Quantum Mechanical view of electron – spinor states, Ground state is a condensate of same spin states – phase coherence k = angular momentum in disc geometry essentially XY model physics – physics of superfluid expect: (1) Goldstone mode (2) elementary charged vortices-merons (3) finite T BKT transition fixed relative number of particles state =
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d large Fermi-liquid-like state Approprite quasiparticles CFs (composite fermions) Th: B.I. Halperin, P.A. Lee, and N. Read, PRB 47, 7312 (1993),…, Exp: R.L. Willett et al., PRL 71, 3846 (1993),…
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Experiments Spielman et al., PRL 87, 036803 (2001)Kellogg et al., PRL 93, 036801 (2004)
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Discrepancies from ideal superfluid – “imperfect superfluid” Kellogg et al., PRL 93, 036801 (2004) Experiments
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drag – evolution with d persistance of intercorrelations for large d Kellogg et al., PRL 90, 246801 (2003)
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Experiments – transition at finite T Conductance at zero bias G(0) vs. T, d Phase boundary at ν T = 1 Champagne et al., PRL 100, 096801 (2008)
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What about intermediate distances, how transition proceeds? What is the superfluid disordering that results in ?
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Two paradigms of superfluid disordering: (1) BKT (2D XY) dipole unbinding (2) λ (3D XY) condensation of loops
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AB M.V.Milovanovic, Bull. Am. Phys. Soc. 48 (2003); S.H. Simon, E.H. Rezayi, and M.V. Milovanovic, PRL 91, 046803 (2003)
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(a) and (c) superfluid (b) dsf., com. – vortex metal (d) dsf., incom. – top. phase? M.V.Milovanovic, PRB 75, 035314(2007), Z. Papic and M.V. Milovanovic, PRB 75, 195304(2007) (I) (II)
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Chern-Simons linear response (a)(b)
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(a) (b): vortex metal – (I) universality class (a): neutral fermion pairs in dual (Laughlin plasma) picture (a) (b) BKT unbinding or dipole dissociation M.V.Milovanovic and Z.Papic, PRB 79, 115319 (2009)
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(a):
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exactly rewritten as: Fock space of neutral fermions:
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Stern and Halperin proposal with phase separation (fermi liquid puddles inside superfluid) explains drag experiments by deriving semicircle law - A.Stern and B.I. Halperin, PRL 88, 106801 (2002) But also (a) and (b) (homogenous wave functions) in a Chern-Simons response conform to semicircle law!
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semicircle law S.H.Simon et al., PRL 91, 046803(2003) ( case case (b): Z. Papic and M.V. Milovanovic, PRB 75, 195304(2007)
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( MM (c) © (c): spin-wave (phonon) contribution- in (II) universalty class B Bogoliubov:Chern-Simons: from wave functions: 1+1 neutral fermion (I) (II) Lopez, Fradkin PRB 51, 4347 (1995);Jiang,Ye PRB74, 245311(2006)
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(c) (d): topological phase? -(II) univesality class (d): M.V.Milovanovic and Z.Papic, PRB 79,115319 (2009)
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use bosonic CFT analogies:
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Excitations :
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There must be also a branch of gapless excitations topological phase is of the kind described by BF Chern-Simons theory But But! can be any real number, also zero by CFT analogies:
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(1) impurities in exps. on bilayer cause BKT disordering via pairs of neutral fermions (they lock charged elementary merons) (2) we may hope that sufficiently clean bilayer systems may serve as generators (via loop condensation) of (quasi) topological phases described by doubled Chern-Simons theories
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