7,378 research outputs found
Nanocrystalline iron at high pressure
X-ray diffraction measurements were performed on nanocrystalline iron up to 46 GPa. For nanocrystalline epsilon-Fe, analysis of lattice parameter data provides a bulk modulus, K, of 179±8 GPa and a pressure derivative of the bulk modulus, K[prime], of 3.6±0.7, similar to the large-grained control sample. The extrapolated zero-pressure unit cell volume of nanocrystalline epsilon-Fe is 22.9±0.2 Ă
^3, compared to 22.3±0.2 Ă
^3 for large-grained epsilon-Fe. No significant grain growth was observed to occur under pressure
About the initial mass function and HeII emission in young starbursts
We demonstrate that it is crucial to account for the evolution of the
starburst population in order to derive reliable numbers of O stars from
integrated spectra for burst ages t > 2 - 3 Myr. In these cases the method of
Vacca & Conti (1992) and Vacca (1994) systematically underestimates the number
of O stars. Therefore the current WR/O number ratios in Wolf-Rayet (WR)
galaxies are overestimated. This questions recent claims about flat IMF slopes
(alpha ~ 1-2) in these objects. If the evolution of the burst is properly
treated we find that the observations are indeed compatible with a Salpeter
IMF, in agreement with earlier studies.
Including recent predictions from non-LTE, line blanketed model atmospheres
which account for stellar winds, we synthesize the nebular and WR HeII 4686
emission in young starbursts. For metallicities 1/5 <= Z/Z_sun <= 1 we predict
a strong nebular HeII emission due to a significant fraction of WC stars in
early WR phases of the burst. For other metallicities broad WR emission will
always dominate the HeII emission. Our predictions of the nebular HeII
intensity agree well with the observations in WR galaxies and an important
fraction of the giant HII regions where nebular HeII is detected. We propose
further observational tests of our result.Comment: ApJ Letters, accepted. 8 pages LaTeX including 3 PostScript figures,
uses AASTeX and psfig macros. PostScript file also available at
ftp://ftp.stsci.edu/outside-access/out.going/schaerer/imf.p
A detector for continuous measurement of ultra-cold atoms in real time
We present the first detector capable of recording high-bandwidth real time
atom number density measurements of a Bose Einstein condensate. Based on a
two-color Mach-Zehnder interferometer, our detector has a response time that is
six orders of magnitude faster than current detectors based on CCD cameras
while still operating at the shot-noise limit. With this minimally destructive
system it may be possible to implement feedback to stabilize a Bose-Einstein
condensate or an atom laser.Comment: 3 pages, 3 figures, submitted to optics letter
FZZ Scattering
We study the duality between the two dimensional black hole and the
sine-Liouville conformal field theories via exact operator quantization of a
classical scattering problem. The ideas are first illustrated in Liouville
theory, which is dual to itself under the interchange of the Liouville
parameter b by 1/b. In both cases, a classical scattering problem does not
determine uniquely the quantum reflection coefficient. The latter is only fixed
by assuming that the dual scattering problem has the same reflection
coefficient. We also discuss the relation of this approach to the method that
exploits the parafermionic symmetry of the model to compute the reflection
coefficient.Comment: 19 pages, JHEP style. v2: Minor changes in the proposed field of
sine-Liouville type, new section discussing the relation with parafermionic
symmetry, references adde
The Radius of Metric Subregularity
There is a basic paradigm, called here the radius of well-posedness, which
quantifies the "distance" from a given well-posed problem to the set of
ill-posed problems of the same kind. In variational analysis, well-posedness is
often understood as a regularity property, which is usually employed to measure
the effect of perturbations and approximations of a problem on its solutions.
In this paper we focus on evaluating the radius of the property of metric
subregularity which, in contrast to its siblings, metric regularity, strong
regularity and strong subregularity, exhibits a more complicated behavior under
various perturbations. We consider three kinds of perturbations: by Lipschitz
continuous functions, by semismooth functions, and by smooth functions,
obtaining different expressions/bounds for the radius of subregularity, which
involve generalized derivatives of set-valued mappings. We also obtain
different expressions when using either Frobenius or Euclidean norm to measure
the radius. As an application, we evaluate the radius of subregularity of a
general constraint system. Examples illustrate the theoretical findings.Comment: 20 page
Report of the International Society of Hypertension (ISH) Hypertension Teaching Seminar organized by the ISH Africa Regional Advisory Group: Maputo, Mozambique, 2016
The International Society of Hypertension (ISH), in fulfilment of its mission of promoting hypertension control and prevention and also of advancing knowledge globally, organizes hypertension teaching seminars or âsummer schoolsâ worldwide through the ISH Regional Advisory Groups. In Africa, seven of such seminars have been organized. This is a report of the eighth seminar held in Maputo, Mozambique, April, 2016. The seminar was attended by over 65 participants from 11 African countries. The Faculty consisted of 11 international hypertension experts. The eighth African hypertension seminar was a great success as confirmed by a pre- and post-test questionnaire
Discussion Paper on an Australian Voluntary Code of Practice for Disinformation
Discussion paper prepared to accompany the release of the Australian Voluntary Code of Practice on Disinformation
Effect of sheared flows on classical and neoclassical tearing modes
The influence of toroidal sheared equilibrium flows on the nonlinear evolution of classical and neoclassical tearing modes is studied through numerical solutions of a set of reduced generalized MHD equations that include viscous force effects based on neoclassical closures. In general, differential flow is found to have a strong stabilizing influence leading to lower saturated island widths for the classical tearing mode and reduced growth rates for the neoclassical mode. Velocity shear, on the other hand, is seen to make a destabilizing contribution
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