4,429 research outputs found
New limits on the EC and ECEC processes in Te
New limits on the double beta processes for Te have been obtained
using a 400 cm HPGe detector and a source consisting of natural Te0
powder. At a confidence level of 90% the limits are y for
the EC transition to the ground state, y for the ECEC transition to the first 2 excited
state of Sn (1171.26 keV) and y for
different ECEC() captures to the ground state of Sn.Comment: 9 pages, 4 figures; v2: minor change
Extensions of Noether's Second Theorem: from continuous to discrete systems
A simple local proof of Noether's Second Theorem is given. This proof
immediately leads to a generalization of the theorem, yielding conservation
laws and/or explicit relationships between the Euler--Lagrange equations of any
variational problem whose symmetries depend upon a set of free or
partly-constrained functions. Our approach extends further to deal with finite
difference systems. The results are easy to apply; several well-known
continuous and discrete systems are used as illustrations
Testing Mundell’s Intuition of Endogenous OCA Theory
This paper presents an empirical assessment of the endogenous optimum currency area theory. Frankel and Rose (1998) study the endogeneity of a currency union through the lens of international trade flows. Our study extends Frankel and Rose's model by using FDI flows to test the original theory developed by Mundell in 1973. A gravity model is used to empirically assess the effectiveness of the convergence criteria by examining location specific advantages that guide multinational investment within the European Union. A fixed effects model based on a panel data of foreign direct investment (FDI) flows within the EU-15 shows that horizontal investment promotes the diffusion of the production process across the national border. Specifically, our results suggest that economic convergence ensured by belonging to the common currency area helps double FDI flows.economic integration, gravity model, endogenous optimum currency area
Enhanced iron magnetic moment in the ThFe11C2 intermetallic compound
International audienceDetailed theoretical investigations on the electronic and magnetic properties of the ThFe11C2 compound have been performed using both the linear muffin-tin orbital and Korringa-Kohn-Rostocker methods of band structure calculation. The structure of the ThFe11C2 compound has three inequivalent iron sites with different local environment. A strongly enhanced magnetic moment is observed on certain Fe positions, coexisting with much lower magnetic moments on other iron positions of the lattice. Band structure calculations indeed show that the Fe magnetic moments depend strongly on the local environment. The average Fe magnetic moment obtained from these calculations is in good agreement with the experimental average Fe moment obtained from magnetization measurements. The orbital contribution to the magnetic moment is found to be especially large on the Fe 4b position. Comparing calculated hyperfine fields with experimental results, it is found that the calculated and experimental hyperfine fields are correlated. However, similarly to the results reported before for elemental Fe, the magnitude of all calculated Fe hyperfine fields is about 25% smaller. The agreement with the Mössbauer measurements is improved by scaling the core polarization contribution and by estimating the orbital valence d-electrons contribution to the magnetic hyperfine fields using the local spin density approximation + dynamical mean field theory calculated orbital moments
Carter County - Railroads & Industry
A 1992 manuscript written by Hubert V. Crawford titled The Role of Railroads and Heavy Industry in Carter County, Kentucky
Carter County - Carter Caves
A history of the founding of Carter Caves Park by Hubert V. Crawford written sometime in the 1990s
Carter County - Schools
A 1993 manuscript written by Hubert V. Crawford titled Carter County Public School System: Then and Now
Inverse transition in the two dimensional dipolar frustrated ferromagnet
We show that the mean field phase diagram of the dipolar frustrated
ferromagnet in an external field presents an inverse transition in the
field-temperature plane. The presence of this type of transition has recently
been observed experimentally in ultrathin films of Fe/Cu(001). We study a
coarse-grained model Hamiltonian in two dimensions. The model supports stripe
and bubble equilibrium phases, as well as the paramagnetic phase. At variance
with common expectations, already in a single mode approximation, the model
shows a sequence of paramagnetic-bubbles-stripes-paramagnetic phase transitions
upon lowering the temperature at fixed external field. Going beyond the single
mode approximation leads to the shrinking of the bubbles phase, which is
restricted to a small region near the zero field critical temperature. Monte
Carlo simulations results with a Heisenberg model are consistent with the mean
field results.Comment: 8 pages, 6 figure
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