6,780 research outputs found
Program on stimulating operational private sector use of Earth observation satellite information
Ideas for new businesses specializing in using remote sensing and computerized spatial data systems were developd. Each such business serves as an 'information middleman', buying raw satellite or aircraft imagery, processing these data, combining them in a computer system with customer-specific information, and marketing the resulting information products. Examples of the businesses the project designed are: (1) an agricultural facility site evaluation firm; (2) a mass media grocery price and supply analyst and forecaster; (3) a management service for privately held woodlots; (4) a brokerage for insulation and roofing contractors, based on infrared imagery; (5) an expanded real estate information service. In addition, more than twenty-five other commercially attractive ideas in agribusiness, forestry, mining, real estate, urban planning and redevelopment, and consumer information were created. The commercial feasibility of the five business was assessed. This assessment included market surveys, revenue projections, cost analyses, and profitability studies. The results show that there are large and enthusiastic markets willing to pay for the services these businesses offer, and that the businesses could operate profitably
Seventy-Seven Sweet Songs and Thirty-Six Familiar Hymns and Gospel Songs: A Collection of Hymns and Tunes for Gospel Meetings and All Occasions of Christian Work and Worship.
https://digitalcommons.acu.edu/crs_books/1039/thumbnail.jp
An exactly solvable toy model that mimics the mode coupling theory of supercooled liquid and glass transition
A toy model is proposed which incorporates the reversible mode coupling
mechanism responsible for ergodic-nonergodic transition with trivial
Hamiltonian in the mode coupling theory (MCT) of structural glass transition.
The model can be analyzed without relying on uncontrolled approximations
inevitable in the current MCT. The strength of hopping processes can be easily
tuned and the ideal glass transition is reproduced only in a certain range of
the strength. On the basis of the analyses of our model we discuss about a
sharp ergodic-nonergodic transition and its smearing out by "hopping".Comment: 5 pages, 2 ps-figures, inappropriate terms replace
Expansion for -Core Percolation
The physics of -core percolation pertains to those systems whose
constituents require a minimum number of connections to each other in order
to participate in any clustering phenomenon. Examples of such a phenomenon
range from orientational ordering in solid ortho-para mixtures to
the onset of rigidity in bar-joint networks to dynamical arrest in
glass-forming liquids. Unlike ordinary () and biconnected ()
percolation, the mean field -core percolation transition is both
continuous and discontinuous, i.e. there is a jump in the order parameter
accompanied with a diverging length scale. To determine whether or not this
hybrid transition survives in finite dimensions, we present a expansion
for -core percolation on the -dimensional hypercubic lattice. We show
that to order the singularity in the order parameter and in the
susceptibility occur at the same value of the occupation probability. This
result suggests that the unusual hybrid nature of the mean field -core
transition survives in high dimensions.Comment: 47 pages, 26 figures, revtex
Simulated annealing for generalized Skyrme models
We use a simulated annealing algorithm to find the static field configuration
with the lowest energy in a given sector of topological charge for generalized
SU(2) Skyrme models. These numerical results suggest that the following
conjecture may hold: the symmetries of the soliton solutions of extended Skyrme
models are the same as for the Skyrme model. Indeed, this is verified for two
effective Lagrangians with terms of order six and order eight in derivatives of
the pion fields respectively for topological charges B=1 up to B=4. We also
evaluate the energy of these multi-skyrmions using the rational maps ansatz. A
comparison with the exact numerical results shows that the reliability of this
approximation for extended Skyrme models is almost as good as for the pure
Skyrme model. Some details regarding the implementation of the simulated
annealing algorithm in one and three spatial dimensions are provided.Comment: 14 pages, 6 figures, added 2 reference
Metal-superconductor transition at zero temperature: A case of unusual scaling
An effective field theory is derived for the normal metal-to-superconductor
quantum phase transition at T=0. The critical behavior is determined exactly
for all dimensions d>2. Although the critical exponents \beta and \nu do not
exist, the usual scaling relations, properly reinterpreted, still hold. A
complete scaling description of the transition is given, and the physics
underlying the unusual critical behavior is discussed. Quenched disorder leads
to anomalously strong T_c-fluctuations which are shown to explain the
experimentally observed broadening of the transition in low-T_c thin films.Comment: 4 pp., no figs, final version as publishe
Quantum critical behavior in disordered itinerant ferromagnets: Logarithmic corrections to scaling
The quantum critical behavior of disordered itinerant ferromagnets is
determined exactly by solving a recently developed effective field theory. It
is shown that there are logarithmic corrections to a previous calculation of
the critical behavior, and that the exact critical behavior coincides with that
found earlier for a phase transition of undetermined nature in disordered
interacting electron systems. This confirms a previous suggestion that the
unspecified transition should be identified with the ferromagnetic transition.
The behavior of the conductivity, the tunneling density of states, and the
phase and quasiparticle relaxation rates across the ferromagnetic transition is
also calculated.Comment: 15pp., REVTeX, 8 eps figs, final version as publishe
Mode-coupling theory of the stress-tensor autocorrelation function of a dense binary fluid mixture
We present a generalized mode-coupling theory for a dense binary fluid
mixture. The theory is used to calculate molecular-scale renormalizations to
the stress-tensor autocorrelation function (STAF) and to the long-wavelength
zero-frequency shear viscosity. As in the case of a dense simple fluid, we find
that the STAF appears to decay as over an intermediate range of
time. The coefficient of this long-time tail is more than two orders of
magnitude larger than that obtained from conventional mode-coupling theory. Our
study focuses on the effect of compositional disorder on the decay of the STAF
in a dense mixture.Comment: Published; withdrawn since ordering in the archive gives misleading
impression of new publicatio
Local field theory for disordered itinerant quantum ferromagnets
An effective field theory is derived that describes the quantum critical
behavior of itinerant ferromagnets in the presence of quenched disorder. In
contrast to previous approaches, all soft modes are kept explicitly. The
resulting effective theory is local and allows for an explicit perturbative
treatment. It is shown that previous suggestions for the critical fixed point
and the critical behavior are recovered under certain assumptions. The validity
of these assumptions is discussed in the light of the existence of two
different time scales. It is shown that, in contrast to previous suggestions,
the correct fixed point action is not Gaussian, and that the previously
proposed critical behavior was correct only up to logarithmic corrections. The
connection with other theories of disordered interacting electrons, and in
particular with the resolution of the runaway flow problem encountered in these
theories, is also discussed.Comment: 17pp., REVTeX, 5 eps figs, final version as publishe
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