2,616 research outputs found
Susceptibilidade à Erosão Hídrica na Bacia da Ribeira Seca (Santiago, Cabo Verde)
Na Ilha de Santiago, em Cabo Verde, a erosão hídrica é o processo que afecta áreas
mais extensas. A ocorrência de aguaceiros intensos e concentrados no tempo e no espaço
promovem uma marcada erosividade das precipitações, com forte irregularidade regional. A
grande variabilidade dos declives e das formas das vertentes, associadas à diversidade
litológica, bem como à multiplicidade de ocupação do solo, permitem condições de
erodibilidade muito contrastadas no espaço.
O objectivo deste trabalho é obter um mapa de susceptibilidade à erosão hídrica para a bacia
da Ribeira Seca (Santiago oriental) com base no modelo digital do terreno (MDT), nos mapas
geológico e de ocupação do solo e na distribuição da erosividade das precipitações.
Verifica-se que o sector sudeste da bacia é o mais susceptível à erosão hídrica, pois nele
ocorrem a maior concentração diária das precipitações e as condições geomorfológicas e de
coberto do solo de mais elevada erodibilidade.In Santiago Island, Cape Verde, the hidric erosion is the most widespread process. The
rainfall events are high concentred and intense promoting strong precipitation erosivity and
have a great spatial variability. The high diversity of slopes steepness, lanforms, geological
units and land cover is responsible for the great spatial contrast of erodibility conditions.
The goal of this study is to produce a susceptibility hidric erosion map for Ribeira Seca basin
(Santiago oriental) based on a Digital Elevation Model (DEM) and on geological, land cover
and rain erosivity maps.
The results show that the south-eastern area of the basin is the most susceptible to hidric
erosion, due to local daily rainfall concentration and geomorphological and land cover
conditions of higher erodibility
Thou Shalt is not You Will
In this paper we discuss some reasons why temporal logic might not be
suitable to model real life norms. To show this, we present a novel deontic
logic contrary-to-duty/derived permission paradox based on the interaction of
obligations, permissions and contrary-to-duty obligations. The paradox is
inspired by real life norms
Magnetovac Cylinder to Magnetovac Torus
A method for mapping known cylindrical magnetovac solutions to solutions in
torus coordinates is developed. Identification of the cylinder ends changes
topology from R1 x S1 to S1 x S1. An analytic Einstein-Maxwell solution for a
toroidal magnetic field in tori is presented. The toroidal interior is matched
to an asymptotically flat vacuum exterior, connected by an Israel boundary
layer.Comment: to appear in Class. Quant. Gra
Interplay between bending and stretching in carbon nanoribbons
We investigate the bending properties of carbon nanoribbons by combining
continuum elasticity theory and tight-binding atomistic simulations. First, we
develop a complete analysis of a given bended configuration through continuum
mechanics. Then, we provide by tight-binding calculations the value of the
bending rigidity in good agreement with recent literature. We discuss the
emergence of a stretching field induced by the full atomic-scale relaxation of
the nanoribbon architecture. We further prove that such an in-plane strain
field can be decomposed into a first contribution due to the actual bending of
the sheet and a second one due to edge effects.Comment: 5 pages, 6 figure
Condiciones ambientales y diferenciación social en los patrones de movilidad: el caso de las desigualdades de género en el Área Metropolitana de Lisboa
Place determinants and social dimensions interact to produce mobility patterns. The article
seeks to measure to what extent the physical and social conditions of the residency place modulate
the intensity of mobility particularly in what concerns gender inequalities. To do so, we first present
the theoretical framework, which guides our perspective on mobility inequalities and the geographical
focus: Lisbon Metropolitan Area (LMA). Secondly, using logistic regression on representative data
from a survey to LMA inhabitants we elaborate on the concept of environmental motility and its
relationship to various types of inequality. Lastly, we systematize a view on accumulated inequalities
examining how local environments may increase the mobilities gender gap.info:eu-repo/semantics/publishedVersio
Riemannian Geometry of Noncommutative Surfaces
A Riemannian geometry of noncommutative n-dimensional surfaces is developed
as a first step towards the construction of a consistent noncommutative
gravitational theory. Historically, as well, Riemannian geometry was recognized
to be the underlying structure of Einstein's theory of general relativity and
led to further developments of the latter. The notions of metric and
connections on such noncommutative surfaces are introduced and it is shown that
the connections are metric-compatible, giving rise to the corresponding Riemann
curvature. The latter also satisfies the noncommutative analogue of the first
and second Bianchi identities. As examples, noncommutative analogues of the
sphere, torus and hyperboloid are studied in detail. The problem of covariance
under appropriately defined general coordinate transformations is also
discussed and commented on as compared with other treatments.Comment: 28 pages, some clarifications, examples and references added, version
to appear in J. Math. Phy
Minimal resonances in annular non-Euclidean strips
Differential growth processes play a prominent role in shaping leaves and
biological tissues. Using both analytical and numerical calculations, we
consider the shapes of closed, elastic strips which have been subjected to an
inhomogeneous pattern of swelling. The stretching and bending energies of a
closed strip are frustrated by compatibility constraints between the curvatures
and metric of the strip. To analyze this frustration, we study the class of
"conical" closed strips with a prescribed metric tensor on their center line.
The resulting strip shapes can be classified according to their number of
wrinkles and the prescribed pattern of swelling. We use this class of strips as
a variational ansatz to obtain the minimal energy shapes of closed strips and
find excellent agreement with the results of a numerical bead-spring model.
Within this class of strips, we derive a condition under which a strip can have
vanishing mean curvature along the center line.Comment: 14 pages, 13 figures. Published version. Updated references and added
2 figure
On the differential geometry of curves in Minkowski space
We discuss some aspects of the differential geometry of curves in Minkowski
space. We establish the Serret-Frenet equations in Minkowski space and use them
to give a very simple proof of the fundamental theorem of curves in Minkowski
space. We also state and prove two other theorems which represent Minkowskian
versions of a very known theorem of the differential geometry of curves in
tridimensional Euclidean space. We discuss the general solution for torsionless
paths in Minkowki space. We then apply the four-dimensional Serret-Frenet
equations to describe the motion of a charged test particle in a constant and
uniform electromagnetic field and show how the curvature and the torsions of
the four-dimensional path of the particle contain information on the
electromagnetic field acting on the particle.Comment: 10 pages. Typeset using REVTE
A note on the computation of geometrically defined relative velocities
We discuss some aspects about the computation of kinematic, spectroscopic,
Fermi and astrometric relative velocities that are geometrically defined in
general relativity. Mainly, we state that kinematic and spectroscopic relative
velocities only depend on the 4-velocities of the observer and the test
particle, unlike Fermi and astrometric relative velocities, that also depend on
the acceleration of the observer and the corresponding relative position of the
test particle, but only at the event of observation and not around it, as it
would be deduced, in principle, from the definition of these velocities.
Finally, we propose an open problem in general relativity that consists on
finding intrinsic expressions for Fermi and astrometric relative velocities
avoiding terms that involve the evolution of the relative position of the test
particle. For this purpose, the proofs given in this paper can serve as
inspiration.Comment: 8 pages, 2 figure
Circular Orbits in Einstein-Gauss-Bonnet Gravity
The stability under radial and vertical perturbations of circular orbits
associated to particles orbiting a spherically symmetric center of attraction
is study in the context of the n-dimensional: Newtonian theory of gravitation,
Einstein's general relativity, and Einstein-Gauss-Bonnet theory of gravitation.
The presence of a cosmological constant is also considered. We find that this
constant as well as the Gauss-Bonnet coupling constant are crucial to have
stability for .Comment: 11 pages, 4 figs, RevTex, Phys. Rev. D, in pres
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