22,396 research outputs found

    Magnetic properties of the spin-1 two-dimensional J1J3J_1-J_3 Heisenberg model on a triangular lattice

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    Motivated by the recent experiment in NiGa2_2S4_4, the spin-1 Heisenberg model on a triangular lattice with the ferromagnetic nearest- and antiferromagnetic third-nearest-neighbor exchange interactions, J1=(1p)JJ_1 = -(1-p)J and J3=pJ,J>0J_3 = pJ, J > 0, is studied in the range of the parameter 0p10 \leq p \leq 1. Mori's projection operator technique is used as a method, which retains the rotation symmetry of spin components and does not anticipate any magnetic ordering. For zero temperature several phase transitions are observed. At p0.2 p \approx 0.2 the ground state is transformed from the ferromagnetic order into a disordered state, which in its turn is changed to an antiferromagnetic long-range ordered state with the incommensurate ordering vector at p0.31p \approx 0.31. With growing pp the ordering vector moves along the line to the commensurate point Qc=(2π/3,0)Q_c = (2 \pi /3, 0), which is reached at p=1p = 1. The final state with the antiferromagnetic long-range order can be conceived as four interpenetrating sublattices with the 120deg120\deg spin structure on each of them. Obtained results offer a satisfactory explanation for the experimental data in NiGa2_2S4_4.Comment: 2 pages, 3 figure

    A simulation model of time-dependent plasma-spacecraft interactions

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    A plasma simulation code is presented that models the time-dependent plasma properties in the vicinity of a spherical, charged spacecraft. After showing agreement with analytic, steady-state theories and ATS-6 satellite data, the following three problems are treated: (1) transient pulses from photoemission at various emission temperatures and ambient plasma conditions, (2) spacecharge limited emission, and (3) simulated plasma oscillations in the long wavelength limit

    Magnetic phase diagram of the spin-1 two-dimensional J1-J3 Heisenberg model on a triangular lattice

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    The spin-1 Heisenberg model on a triangular lattice with the ferromagnetic nearest, J1=(1p)J,J_1=-(1-p)J, J>0J>0, and antiferromagnetic third-nearest-neighbor, J3=pJJ_3=pJ, exchange interactions is studied in the range of the parameter 0p10 \leqslant p \leqslant 1. Mori's projection operator technique is used as a method, which retains the rotation symmetry of spin components and does not anticipate any magnetic ordering. For zero temperature several phase transitions are observed. At p0.2p\approx 0.2 the ground state is transformed from the ferromagnetic spin structure into a disordered state, which in its turn is changed to an antiferromagnetic long-range ordered state with the incommensurate ordering vector Q=Q(1.16,0){\bf Q = Q^\prime} \approx (1.16, 0) at p0.31p\approx 0.31. With the further growth of pp the ordering vector moves along the line QQc{\bf Q^\prime-Q_c} to the commensurate point Qc=(2π3,0){\bf Q_c}=(\frac{2\pi}{3}, 0), which is reached at p=1p = 1. The final state with an antiferromagnetic long-range order can be conceived as four interpenetrating sublattices with the 120120^\circ spin structure on each of them. Obtained results are used for interpretation of the incommensurate magnetic ordering observed in NiGa2_2S4_4.Comment: 18 pages, 6 figures, accepted for publication in Physics Letters

    Stationary Points of Scalar Fields Coupled to Gravity

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    We investigate the dynamics of gravity coupled to a scalar field using a non-canonical form of the kinetic term. It is shown that its singular point represents an attractor for classical solutions and the stationary value of the field may occur distant from the minimum of the potential. In this paper properties of universes with such stationary states are considered. We reveal that such state can be responsible for modern dark energy density.Comment: H. Kroger, invited talk, FFP6, Udine (2004), revised version with corrected author lis

    How well do we know the neutron structure function?

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    We present a detailed analysis of the uncertainty in the neutron F2n structure function extracted from inclusive deuteron and proton deep-inelastic scattering data. The analysis includes experimental uncertainties as well as uncertainties associated with the deuteron wave function, nuclear smearing, and nucleon off-shell corrections. Consistently accounting for the Q^2 dependence of the data and calculations, and restricting the nuclear corrections to microscopic models of the deuteron, we find significantly smaller uncertainty in the extracted F2n/F2p ratio than in previous analyses. In addition to yielding an improved extraction of the neutron structure function, this analysis also provides an important baseline that will allow future, model-independent extractions of neutron structure to be used to examine nuclear medium effects in the the deuteron.Comment: 5 pages, 6 figure

    The spin-1 two-dimensional J1-J2 Heisenberg antiferromagnet on a triangular lattice

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    The spin-1 Heisenberg antiferromagnet on a triangular lattice with the nearest- and next-nearest-neighbor couplings, J1=(1p)JJ_1=(1-p)J and J2=pJJ_2=pJ, J>0J>0, is studied in the entire range of the parameter pp. Mori's projection operator technique is used as a method which retains the rotation symmetry of spin components and does not anticipate any magnetic ordering. For zero temperature four second-order phase transitions are observed. At p0.038p\approx 0.038 the ground state is transformed from the long-range ordered 120120^\circ spin structure into a state with short-range ordering, which in its turn is changed to a long-range ordered state with the ordering vector Q=(0,2π3){\bf Q^\prime}=\left(0,-\frac{2\pi}{\sqrt{3}}\right) at p0.2p\approx 0.2. For p0.5p\approx 0.5 a new transition to a state with a short-range order occurs. This state has a large correlation length which continuously grows with pp until the establishment of a long-range order happens at p0.65p \approx 0.65. In the range 0.5<p<0.960.5<p<0.96, the ordering vector is incommensurate. With growing pp it moves along the line QQ1{\bf Q'-Q}_1 to the point Q1=(0,4π33){\bf Q}_1=\left(0,-\frac{4\pi}{3\sqrt{3}}\right) which is reached at p0.96p\approx 0.96. The obtained state with a long-range order can be conceived as three interpenetrating sublattices with the 120120^\circ spin structure on each of them.Comment: 13 pages, 5 figures, accepted for publication in Physics Letters

    Nucleation and growth of rolling contact failure of 440C bearing steel

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    A 'two-body' elasto-plastic finite element model of 2-dimensional rolling and rolling-plus-sliding was developed to treat the effect of surface irregularities. The model consists of a smooth cylinder in contact with a semi-infinite half-space that is either smooth or fitted with one of 0.4 microns deep or 7 microns deep groove, or a 0.4 microns high ridge-like asperity. The model incorporates elastic-linear-kinematic hardening-plastic (ELKP) and non-linear-kinematic hardening-plastic (NLKP) material constitutive relations appropriate for hardened bearing steel and the 440C grade. The calculated contact pressure distribution is Hertzian for smooth body contact, and it displays intense, stationary, pressure spikes superposed on the Hertzian pressure for contact with the grooved and ridged surface. The results obtained for the 0.4 microns deep groove compare well with those reported by Elsharkawy and Hamrock for an EHD lubricated contact. The effect of translating the counterface on the half space as opposed to indenting the half space with the counter face with no translation is studied. The stress and strain values near the surface are found to be similar for the two cases, whereas they are significantly different in the subsurface. It is seen that when tiny shoulders are introduced at the edge of the groove in the finite element model, the incremental plasticity and residual stresses are significantly higher in the vicinity of the right shoulder (rolling direction is from left to right) than at the left shoulder. This may explain the experimental observation that the spall nucleation occurs at the exit end of the artificially planted indents. Pure rolling calculations are compared with rolling + sliding calculations. For a coefficient of friction, mu = 0.1, the effect of friction is found to be small. Efforts were made to identify the material constitutive relations which best describe the deformation characteristics of the bearing steels in the initial few cycles. Elastic-linear-kinematic hardening-plastic (ELKP) material constitutive relations produce less net plastic deformation in the initial stages for a given stress, than seen in experiments. A new set of constitutive relations: non-linear-kinematic hardening-plastic (NLKP) was used. This material model produces more plasticity than the ELKP model and shows promise for treating the net distortions in the early stages. Techniques for performing experimental measurements that can be compared with the finite element calculations were devised. The measurements are being performed on 9mm-diameter, 440C steel cylindrical rolling elements in contact with 12.5 mm-diameter, 52100 steel balls in a 3-ball-rod fatigue test machine operating at 3600 RPM. Artificial, 7 microns deep, indents were inserted on the running track of the cylindrical rolling elements and profilometer measurements of these indents made, before and after the rolling. These preliminary measurements show that the indents are substantially deformed plastically in the process of rolling. The deformations of the groove calculated with the finite element model are comparable to those measured experimentally

    Comment on ``Dispersion-Independent High-Visibility Quantum Interference ... "

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    We show in this Comment that the interpretation of experimental data as well as the theory presented in Atat\"ure et al. [Phys. Rev. Lett. 84, 618 (2000)] are incorrect and discuss why such a scheme cannot be used to "recover" high-visibility quantum interference.Comment: Comment on Atat\"ure et al. [Phys. Rev. Lett. 84, 618 (2000)], 2nd revision, To appear in Phys. Rev. Lett. April, (2001
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