Simple analytical model of vortex-lattice melting in two-dimensional superconductors

Zhuravlev, V.; Maniv, T.

doi:10.1103/physrevb.60.4277

Cited by 17 publications

(31 citation statements)

References 31 publications

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“…The LLL GL model was also studied numerically in both Lawrence -Doniah model (a good approximation of the 3D GL for large number of layers) [26,27] and in 2D [28] and by a variety of nonperturbative analytical methods. Among them the density functional [29], 1/N [30][31][32], dislocation theory of melting [33] and others [34]. As we show in this paper, the BP liquid free energy combined with the correct two loop solid energy computed recently gives scaled melting temperature a m T = −9.5 and in addition predicts other characteristics of the model.…”

Section: Introduction and The Main Ideamentioning

confidence: 57%

Supercooled vortex liquid and quantitative theory of melting of the flux-line lattice in type-II superconductors

Rosenstein

2004

Phys. Rev. B

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A metastable homogeneous state exists down to zero temperature in systems of repelling objects. Zero "fluctuation temperature" liquid state therefore serves as a (pseudo) "fixed point" controlling the properties of vortex liquid below and even around melting point. There exists Madelung constant for the liquid in the limit of zero temperature which is higher than that of the solid by an amount approximately equal to the latent heat of melting. This picture is supported by an exactly solvable large N Ginzburg -Landau model in magnetic field. Based on this understanding we apply Borel -Pade resummation technique to develop a theory of the vortex liquid in type II superconductors. Applicability of the effective lowest Landau level model is discussed and corrections due to higher levels is calculated. Combined with previous quantitative description of the vortex solid the melting line is located. Magnetization, entropy and specific heat jumps along it are calculated. The magnetization of liquid is larger than that of solid by 1.8% irrespective of the melting temperature. We compare the result with experiments on high T c cuprates Y Ba 2 Cu 3 O 7 , DyBCO, low T c material (K, Ba)BiO 3 and with Monte Carlo simulations.

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Section: Introduction and The Main Ideamentioning

confidence: 57%

Supercooled vortex liquid and quantitative theory of melting of the flux-line lattice in type-II superconductors

Rosenstein

2004

Phys. Rev. B

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“…In 2D systems the energy scale of these fluctuations is much smaller than the SC condensation energy, implying a melting temperature T m well below the mean field T c . 6 Indeed, the magnetization irreversibility line, which follows the boundary between the vortex solid and the vortex liquid, appears in the quasi-2D organics at temperatures far below the mean field T c , 3,7 where magnetoquantum oscillations are detectable. 8,7 In accordance with the resistivity and specific heat data mentioned above, the SC-induced damping of the de Haas-van Alphen ͑dHvA͒ signal in the region around the mean field H c2 was found to be a very smooth function of the magnetic field.…”

Section: Introductionmentioning

confidence: 99%

“…9 This behavior is consistent with the broad crossover between the SC and normal states predicted theoretically for 2D superconductors. 6 The nature of the vortex lattice melting transition in 2D superconductors has been debated in the literature for many years. 9 Early proposals, 10,11 based on the similarity to the Kosterlitz-Thouless-Halperin-Nelson-Young ͑KTHNY͒ theory of melting in 2D solids, 12 have led to the conclusion that the melting transition is continuous.…”

Section: Introductionmentioning

confidence: 99%

Landau orbital description of the vortex state in a two-dimensional extremely type-II superconductor

Zhuravlev

Maniv

2002

Phys. Rev. B

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We extend the application of the recently developed Landau orbital approach to the fluctuating vortex lattice in two-dimensional ͑2D͒ extremely type-II superconductors at high magnetic fields to the region above the melting point. We find that the abrupt incomplete melting of the quasicrystalline vortex phase at TϭT m ӶT c is followed by a broad crossover into an intermediate state with a nematic liquid-crystalline-like order without 2D positional order. A special type of amplitude fluctuations, which can be described as classical transverse vibrations of vortex chains ͑while vortices are accumulated and depleted alternately in individual chains͒, controls this crossover. Due to the 1D nature of these vibrations, the structure factor suffers thermal broadening of the diffraction peaks, which remains effective at temperatures well below the mean field T c . The complete melting into an isotropic vortex fluid is shown to occur only far above T m , since the energy cost of the fluctuations which break the chain structure is of the order of the superconducting condensation energy.

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“…One can further investigate the structure of these supersoft modes and identify them with "shear modes" (Moore, 1989(Moore, , 1992Maniv, 1999, 2002). To conclude, there are many broken continuous symmetries (translations in two directions, rotations and the U (1) phase transformations, forming a rather uncommon in physics Lie group) leading to a single Goldstone mode.…”

Section: Supersoft Goldstone (Shear) Modesmentioning

confidence: 99%

Ginzburg-Landau theory of type II superconductors in magnetic field

2010

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Thermodynamics of type II superconductors in electromagnetic field based on the GinzburgLandau theory is presented. The Abrikosov flux lattice solution is derived using an expansion in a parameter characterizing the "distance" to the superconductor -normal phase transition line. The expansion allows a systematic improvement of the solution. The phase diagram of the vortex matter in magnetic field is determined in detail. In the presence of significant thermal fluctuations on the mesoscopic scale (for example in high Tc materials) the vortex crystal melts into a vortex liquid. A quantitative theory of thermal fluctuations using the lowest Landau level approximation is given. It allows to determine the melting line and discontinuities at melt, as well as important characteristics of the vortex liquid state. In the presence of quenched disorder (pinning) the vortex matter acquires certain "glassy" properties. The irreversibility line and static properties of the vortex glass state are studied using the "replica" method. Most of the analytical methods are introduced and presented in some detail. Various quantitative and qualitative features are compared to experiments in type II superconductors, although the use of a rather universal Ginzburg -Landau theory is not restricted to superconductivity and can be applied with certain adjustments to other physical systems, for example rotating Bose -Einstein condensate.

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Simple analytical model of vortex-lattice melting in two-dimensional superconductors

Cited by 17 publications

References 31 publications

Supercooled vortex liquid and quantitative theory of melting of the flux-line lattice in type-II superconductors

Supercooled vortex liquid and quantitative theory of melting of the flux-line lattice in type-II superconductors

Landau orbital description of the vortex state in a two-dimensional extremely type-II superconductor

Ginzburg-Landau theory of type II superconductors in magnetic field

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