Enteropathogenic Yersinia bacteria trigger the production of the proinflammatory chemokine IL-8, an important chemokine for the recruitment of polymorphonuclear leukocytes (PMN). Yersinia is resistant to phagocytosis by PMN, and the recruitment of these cells is thought to be part of a pathogenic strategy of Yersinia to establish infection by allowing the pathogen to gain access to, and disseminate within, host tissue. We report here that Yersinia expressing the outer membrane protein invasin triggers IL-8 production in epithelial cells. The 195 carboxyl-terminal amino acids of invasin when linked to latex beads are sufficient to trigger IL-8 production. By means of IL-8 promoter reporter gene assays and electrophoretic mobility shift assay experiments, the minimal optimal region of the IL-8 promoter responsive to invasin was identified and invasin-responsive control elements were characterized. Invasin-induced activation of the IL-8 promoter was found to be mediated through a previously identified NF-kappaB element. This NF-kappaB binding site preferentially binds Rel p65-p65 homodimers as well as some p50-p65 heterodimers in response to stimulation by invasin. Invasin-induced NF-kappaB activation correlated with degradation of IkappaBalpha and the inhibition of NF-kappaB by specific inhibitors of IkappaB activation blocked invasin-induced IL-8 secretion. Invasin-triggered IL-8 production does not depend on invasin-triggered uptake of bacteria, and is independent of a functional PI3-kinase. This report is the first to demonstrate the molecular basis of IL-8 production triggered by enteropathogenic bacteria. Together, these data elucidate the possible early pathomechanisms operating in Yersinia infection and may have implications for the design of novel therapeutics directed against this enteropathogen.
We consider a multi-dimensional continuum Schrödinger operator which is given by a perturbation of the negative Laplacian by a compactly supported potential. We establish both an upper and a lower bound on the bipartite entanglement entropy of the ground state of the corresponding quasi-free Fermi gas. The bounds prove that the scaling behaviour of the entanglement entropy remains a logarithmically enhanced area law as in the unperturbed case of the free Fermi gas. The central idea for the upper bound is to use a limiting absorption principle for such kinds of Schrödinger operators.
We consider a multi-dimensional continuum Schrödinger operator which is given by a perturbation of the negative Laplacian by a compactly supported potential. We establish both an upper bound and a lower bound on the bipartite entanglement entropy of the ground state of the corresponding quasi-free Fermi gas. The bounds prove that the scaling behaviour of the entanglement entropy remains a logarithmically enhanced area law as in the unperturbed case of the free Fermi gas. The central idea for the upper bound is to use a limiting absorption principle for such kinds of Schrödinger operators.
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