RESUMO
The differential diagnosis in anogenital ulcer-adenopathy syndrome in men who have sex with men (MSM) is becoming more complex, particularly with lymphogranuloma venereum and syphilis re-establishing endemicity among MSM. Sexual contact has been shown to transmit methicillin-resistant Staphylococcus aureus (MRSA), probably through intimate skin-to-skin contact. We present a case of MRSA genital ulceration and local lymphadenopathy in a man whose sexual partners are men, reporting high-risk sexual behaviour, highlighting the importance of also considering MRSA infection in these cases, and the potential for spread of MRSA infection in the MSM community.
Assuntos
Doenças Linfáticas/microbiologia , Staphylococcus aureus Resistente à Meticilina/isolamento & purificação , Doenças do Pênis/microbiologia , Infecções Estafilocócicas/microbiologia , Infecções Estafilocócicas/patologia , Úlcera/microbiologia , Adulto , Homossexualidade Masculina , Humanos , Doenças Linfáticas/diagnóstico , Masculino , Doenças do Pênis/diagnóstico , Doenças do Pênis/patologia , Úlcera/diagnóstico , Úlcera/patologiaRESUMO
We show that plane wave ultrasoft pseudopotential methods readily extend to the calculation of the structural properties of lanthanide and actinide containing compounds. This is demonstrated through a series of calculations performed on UO, UO2, UO3, U3O8, UC2, alpha-CeC2, CeB6, CeSe, CeO2, NdB6, TmOI, LaBi, LaTiO3, YbO, and elemental Lu.
RESUMO
In this Brief Report we show that the inhomogeneous density obtained from a density-functional theory of classical fluids in the canonical ensemble (CE), recently presented by White et al. [Phys. Rev. Lett. 84, 1220 (2000)], is equivalent to first order to the result of the series expansion of the CE inhomogeneous density introduced by Gonzalez et al. [Phys. Rev. Lett. 79, 2466 (1997)].
RESUMO
We present a density-functional approach for dealing with inhomogeneous fluids in the canonical ensemble. A general relation is proposed between the free-energy functionals in the canonical and the grand canonical ensembles. The minimization of the canonical-ensemble free-energy functional gives rise to Euler-Lagrange equations which involve averaged Ornstein-Zernike equations of second and third order. The theory is especially appropriate for systems with a small, fixed number of particles. As an example of application we obtain accurate results for the density profile of a hard-sphere fluid in a closed spherical cavity that contains only a few particles.