19,006 research outputs found

    Irreversible flow of vortex matter: polycrystal and amorphous phases

    Get PDF
    We investigate the microscopic mechanisms giving rise to plastic depinning and irreversible flow in vortex matter. The topology of the vortex array crucially determines the flow response of this system. To illustrate this claim, two limiting cases are considered: weak and strong pinning interactions. In the first case disorder is strong enough to introduce plastic effects in the vortex lattice. Diffraction patterns unveil polycrystalline lattice topology with dislocations and grain boundaries determining the electromagnetic response of the system. Filamentary flow is found to arise as a consequence of dislocation dynamics. We analize the stability of vortex lattices against the formation of grain boundaries, as well as the steady state dynamics for currents approaching the depinning critical current from above, when vortex motion is mainly localized at the grain boundaries. On the contrary, a dislocation description proves no longer adequate in the second limiting case examined. For strong pinning interactions, the vortex array appears completely amorphous and no remnant of the Abrikosov lattice order is left. Here we obtain the critical current as a function of impurity density, its scaling properties, and characterize the steady state dynamics above depinning. The plastic depinning observed in the amorphous phase is tightly connected with the emergence of channel-like flow. Our results suggest the possibility of establishing a clear distinction between two topologically disordered vortex phases: the vortex polycrystal and the amorphous vortex matter.Comment: 13 pages, 16 figure

    Neighborhood models of minority opinion spreading

    Get PDF
    We study the effect of finite size population in Galam's model [Eur. Phys. J. B 25 (2002) 403] of minority opinion spreading and introduce neighborhood models that account for local spatial effects. For systems of different sizes N, the time to reach consensus is shown to scale as ln N in the original version, while the evolution is much slower in the new neighborhood models. The threshold value of the initial concentration of minority supporters for the defeat of the initial majority, which is independent of N in Galam's model, goes to zero with growing system size in the neighborhood models. This is a consequence of the existence of a critical size for the growth of a local domain of minority supporters

    Nonlinear oscillator with parametric colored noise: some analytical results

    Full text link
    The asymptotic behavior of a nonlinear oscillator subject to a multiplicative Ornstein-Uhlenbeck noise is investigated. When the dynamics is expressed in terms of energy-angle coordinates, it is observed that the angle is a fast variable as compared to the energy. Thus, an effective stochastic dynamics for the energy can be derived if the angular variable is averaged out. However, the standard elimination procedure, performed earlier for a Gaussian white noise, fails when the noise is colored because of correlations between the noise and the fast angular variable. We develop here a specific averaging scheme that retains these correlations. This allows us to calculate the probability distribution function (P.D.F.) of the system and to derive the behavior of physical observables in the long time limit

    1/f1/f noise and avalanche scaling in plastic deformation

    Get PDF
    We study the intermittency and noise of dislocation systems undergoing shear deformation. Simulations of a simple two-dimensional discrete dislocation dynamics model indicate that the deformation rate exhibits a power spectrum scaling of the type 1/fα1/f^{\alpha}. The noise exponent is far away from a Lorentzian, with α≈1.5\alpha \approx 1.5. This result is directly related to the way the durations of avalanches of plastic deformation activity scale with their size.Comment: 6 pages, 5 figures, submitted to Phys. Rev.

    Nonempirical Density Functionals Investigated for Jellium: Spin-Polarized Surfaces, Spherical Clusters, and Bulk Linear Response

    Get PDF
    Earlier tests show that the Tao-Perdew-Staroverov-Scuseria (TPSS) nonempirical meta-generalized gradient approximation (meta-GGA) for the exchange-correlation energy yields more accurate surface energies than the local spin density (LSD) approximation for spin-unpolarized jellium. In this study, work functions and surface energies of a jellium metal in the presence of ``internal'' and external magnetic fields are calculated with LSD, Perdew-Burke-Ernzerhof (PBE) GGA, and TPSS meta-GGA and its predecessor, the nearly nonempirical Perdew-Kurth-Zupan-Blaha (PKZB) meta-GGA, using self-consistent LSD orbitals and densities. The results show that: (i) For normal bulk densities, the surface correlation energy is the same in TPSS as in PBE, as it should be since TPSS strives to represent a self-correlation correction to PBE; (ii) Normal surface density profiles can be scaled uniformly to the low-density or strong-interaction limit, and TPSS provides an estimate for that limit that is consistent with (but probably more accurate than) other estimates; (iii) For both normal and low densities, TPSS provides the same description of surface magnetism as PBE, suggesting that these approximations may be generally equivalent for magnetism. The energies of jellium spheres with up to 106 electrons are calculated using density functionals and compared to those obtained with Diffusion Quantum Monte Carlo data, including our estimate for the fixed-node correction. Finally we calculate the linear response of bulk jellium using these density functionals, and find that not only LSD but also PBE GGA and TPSS meta-GGA yield a linear-response in good agreement with that of the Quantum Monte Carlo method, for wavevectors of the perturbing external potential up to twice the Fermi wavevector.Comment: 14 pages, 9 figure

    Therapeutic change, innovative moments and the reconceptualization of the self: a dialogical account

    Get PDF
    Innovative moments (IMs) are exceptions toward the problematic self-narrative that brought the client to therapy, which emerge in the therapeutic conversation. Dialogically, an IM might be conceived as an expression of an alternative I-position which challenges the dominance of problematic voices, thus having the potential to transform the self-narrative as they are expanded and elaborated. Reconceptualization is a particular type of IM which usually emerges in the middle of the process of a successful treatment, increasing steadily until the end. Moreover, reconceptualization seems to be a distinctive feature of a successful psychotherapy process, as it is almost absent in poor outcome cases. This IM has two main features: the presence of a contrast between a previous self-narrative and a new emergent one, and the access to the process which allowed for the transformation from the former to the last. This innovative moment clearly involves a special I-position which Hermans has characterized as a metaposition. We discuss four functions of this type of IM in the change process: (1) providing a narrative structure for change; (2) bridging the past and present self-narratives; (3) facilitating the progressive identification with the new self-narrative; and (4) allowing surpassing the ambivalence often involved in the change process

    Maintenance and transformation of problematic self-narratives: a semiotic-dialogical approach

    Get PDF
    This study focus on how the emergence of novelties in psychotherapy, which we term Innovative Moments (IMs), progresses to the construction of a new self-narrative. Novelty’s emergence challenge a person’s dominant self-narrative (i.e., usual way of understanding and experiencing), generating uncertainty. Frequently, clients resolve the uncertainty, by attenuating the novelty’s meaning, making a quick return to the dominant self-narrative. From a dialogical perspective, a dominant voice (which organize clients’ self-narrative) and a non-dominant (or innovative) voice (expressed during IMs) establish a cyclical relation – mutual in-feeding – throughout the therapeutic process, blocking self-development. In this article, we analyze a successful psychotherapeutic case focusing on how the relation between dominant and nondominant voices evolve from mutual in-feeding to other forms of dialogical relation. We have identified two processes, using the microgenetic method from a semiotic autoregulatory perspective of the dialogical self: (1) Escalation of the innovative voice(s) and thereby inhibiting the dominant voice and (2) Dominant and innovative voices negotiate and engage in joint action

    Optimization of soliton ratchets in inhomogeneous sine-Gordon systems

    Get PDF
    Unidirectional motion of solitons can take place, although the applied force has zero average in time, when the spatial symmetry is broken by introducing a potential V(x)V(x), which consists of periodically repeated cells with each cell containing an asymmetric array of strongly localized inhomogeneities at positions xix_{i}. A collective coordinate approach shows that the positions, heights and widths of the inhomogeneities (in that order) are the crucial parameters so as to obtain an optimal effective potential UoptU_{opt} that yields a maximal average soliton velocity. UoptU_{opt} essentially exhibits two features: double peaks consisting of a positive and a negative peak, and long flat regions between the double peaks. Such a potential can be obtained by choosing inhomogeneities with opposite signs (e.g., microresistors and microshorts in the case of long Josephson junctions) that are positioned close to each other, while the distance between each peak pair is rather large. These results of the collective variables theory are confirmed by full simulations for the inhomogeneous sine-Gordon system
    • …
    corecore