Monitoring of Iberian wolf expansion in Sabugal: Malcata Region

Relatório de projecto no âmbito de Bolsa Universidade de Lisboa/Fundação Amadeu Dias (2008/2009)Departamento de Biologia Animal, Faculdade de Ciências da Universidade de LisboaScholarship Fundação Amadeu Dias/Universidade de LisboaWind farm construction may cause an effect of repulse on the wildlife. Sabugal – Malcata region has a new wind farm in a zone where the situation of the Iberian wolf (Canis lupus signatus, Cabrera 1907) is considered as precarious. In this context a monitoring project was begun to assess the impact of this infrastructure on the Iberian wolf population. Here are presented the results of eight months of monitoring and some information received during the project about the wolf presence in this region. Every month, signs of wolf presence were prospected in twelve transects in the wind farm adjacent area and fourteen inquires were done to people that can contact with this predator. In all the eight months only two scats were detected and two wolf tracks after a snowfall. The presence of wolves was referred in the inquires as constant before 1990. However, some recent livestock damages were reported. The Roe deer (Capreolus capreolus) seems to be in expansion in this area, being reported in more than half of the inquires. This situation may reveal a new opportunity for settlement of dispersing wolves. The occurrence of the Iberian Wolf in Sabugal – Malcata region continues not to be confirmed, but the designation of probable presence is reinforced.Universidade de Lisboa; Fundação Amadeu Dia

Smoothness of holonomies for codimension 1 hyperbolic dynamics

Hyperbolic invariant sets {Lambda} of C1+{gamma} diffeomorphisms where either the stable or unstable leaves are 1-dimensional are considered in this paper. Under the assumption that the {Lambda} has local product structure, the authors prove that the holonomies between the 1-dimensional leaves are C1+{alpha} for some 0 < {alpha} < 1

Rigidity of hyperbolic sets on surfaces

Given a hyperbolic invariant set of a diffeomorphism on a surface, it is proved that, if the holonomies are sufficiently smooth, then the diffeomorphism on the hyperbolic invariant set is rigid in the sense that it is C1+ conjugate to a hyperbolic affine model

Teichmüller spaces and HR structures for hyperbolic surface dynamics

We construct a Teichmüller space for the C^{1+}-conjugacy classes of hyperbolic dynamical systems on surfaces. After introducing the notion of an HR structure which associates an affine structure with each of the stable and unstable laminations, we show that there is a one-to-one correspondence between these HR structures and the C^{1+}-conjugacy classes. As part of the proof we construct a canonical representative dynamical system for each HR structure. This has the smoothest holonomies of any representative of the corresponding C^{1+}-conjugacy class. Finally, we introduce solenoid functions and show that they provide a good Teichmüller space

Discontinuous Almost Automorphic Functions and Almost Automorphic Solutions of Differential Equations with Piecewise Constant Argument

In this article we introduce a class of discontinuous almost automorphic functions which appears naturally in the study of almost automorphic solutions of differential equations with piecewise constant argument. Their fundamental properties are used to prove the almost automorphicity of bounded solutions of a system of differential equations with piecewise constant argument. Due to the strong discrete character of these equations, the existence of a unique discrete almost automorphic solution of a non-autonomous almost automorphic difference system is obtained, for which conditions of exponential dichotomy and discrete Bi-almost automorphicity are fundamental

Are Hispanics Discriminated Against in the US Criminal Justice System?

Recent publications have contributed to increase the perception among Hispanics of an unfair and unequal treatment of this community by the US Criminal Justice System. One of the major concerns was the claim that Hispanics are incarcerated before conviction nearly twice as often as Whites. Unfair treatment perception by the population reduces legitimacy of police and government, and thus, it is imperative to analyze these uninvestigated allegations. Therefore, the purpose of this study is to address said allegations of discrimination against Hispanics and analyze with updated and reliable statistics whether Hispanics are incarcerated before conviction more often than Whites. There has been much research exploring the effects of race and ethnicity in the US criminal justice system, however most of it is focused on African Americans but not Hispanics although it is the largest and fastest growing minority in the United States. The present study is based on data collected in the Annual Survey of Jails, 2014 prepared by the Office of Justice Programs, Bureau of Justice Statistics, US Department of Justice. Starting in 2010, the Bureau of Justice Statistics improved the Annual Survey of Jails survey instruments to address certain topics, among others, the number of inmates that are unsentenced. Therefore this allows for the first time to obtain such information with reliable data and not based on a sample survey estimation. From the regression analysis of the data of this study, it resulted that the model accounted for 77% of the explanation of the relationship between the possibility of being incarcerated without conviction in a US jail and the fact of being Hispanic. However, this relationship was not statistically significant when controlling for age and gender. The Level of confidence in this study was 95%.https://scholarscompass.vcu.edu/gradposters/1019/thumbnail.jp