Institution
Simón Bolívar University
Education•Caracas, Venezuela•
About: Simón Bolívar University is a education organization based out in Caracas, Venezuela. It is known for research contribution in the topics: Population & Crystallization. The organization has 5912 authors who have published 8294 publications receiving 126152 citations.
Topics: Population, Crystallization, Context (language use), Nucleation, Differential scanning calorimetry
Papers published on a yearly basis
Papers
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TL;DR: In this paper, B2NiMn and Ni2MnAl Heusler nanoprecipitates are designed via elastic misfit stabilization in Fe-Mn maraging steels by combining transmission electron microscopy (TEM) correlated atom probe tomography (APT) with ab initio simulations.
68 citations
TL;DR: The widespread observed distribution suggests that Hg is being carried along long distances within the region due to its high concentrations found in "pristine" reefs.
68 citations
TL;DR: In this paper, the behaviour of the females accounted for most of the variation in individual alert rate and the behavior of the subordinate males accounted for the most variation in total alert rate in Capybaras.
68 citations
TL;DR: In this article, it was shown that the set A+ of positive invertible elements of a C*-algebra has a natural structure of reductive homogeneous manifold with a Finsler metric.
Abstract: The set A+ of positive invertible elements of a C*-algebra has a natural structure of reductive homogeneous manifold with a Finsler metric. Because pairs of points can be joined by uniquely determined geodesics and geodesics are "short" curves, there is a natural notion of convexity: C ⊂ A+ is convex if the geodesic segment joining a, b ∈ C is contained in C. We show that this notion is related to the classical convexity of real and operator valued functions. Several results about convexity are proved in this paper. The expressions of these results are closely related to the operator means of Kubo and Ando, in particular to the geometric mean of Pusz and Woronowicz, and they produce several norm estimations and operator inequalities.
68 citations
TL;DR: In this article, a family of static solutions of the Einstein field equations with spherical symmetry for a locally anisotropic fluid with homogeneous energy density is obtained, which depend on two adjustable parameters related to degree of anisotropy.
Abstract: A family of static solutions of the Einstein field equations with spherical symmetry for a locally anisotropic fluid with homogeneous energy density is obtained. These solutions depend on two adjustable parameters related to degree of anisotropy of the fluid. Some known solutions may be recovered for specific values of these parameters. As a difference to other known solutions it is possible to change the grade of anisotropy of the model, keeping the same functional dependence on the coordinates. By means of a slow adiabatic contraction, the stability of the obtained solutions is studied. Also, it is shown, how it is possible to enhance the stability of the models by adjusting the parameters, and to obtain more compact configurations than those obtained with other similar anisotropic solutions, while the dominant or strong energy condition holds within the sphere.
68 citations
Authors
Showing all 5925 results
| Name | H-index | Papers | Citations |
|---|---|---|---|
| Franco Nori | 114 | 1117 | 63808 |
| Ignacio Rodriguez-Iturbe | 96 | 334 | 32283 |
| Ian W. Hamley | 78 | 469 | 25800 |
| Francisco Zaera | 73 | 432 | 19907 |
| Thomas G. Habetler | 73 | 395 | 20725 |
| Douglas L. Jones | 70 | 512 | 21596 |
| I. Taboada | 66 | 346 | 13528 |
| Enrique Herrero | 64 | 242 | 11653 |
| Rudi Studer | 60 | 268 | 19876 |
| Alejandro J. Müller | 58 | 420 | 12410 |
| David Padua | 58 | 243 | 11155 |
| Rudolf Jaffé | 58 | 182 | 10268 |
| Luis Balicas | 57 | 328 | 14114 |
| Volker Abetz | 55 | 386 | 11583 |
| Ananias A. Escalante | 51 | 160 | 8866 |