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We examine the electronic structure of δ-Pu, PuCoGa5, and PuO2 using high resolution as well as angle-resolved photoelectron spectroscopy. The fermiology of the strongly correlated metals δ-Pu and PuCoGa5 is investigated by determining the primary quasiparticle peak position with respect to the Fermi energy as well as the crystal momentum dependence of this peak for PuCoGa5. For the Mott insulator PuO2, the photoemission results are compared against the hybrid functional calculations and the prediction of significant covalency, is found to be reasonable.
In previous papers, Barr and Raphael investigated the situation of a topological space
and a subspace
such that the induced map
is an epimorphism in the category
of commutative rings (with units). We call such an embedding a
-epic embedding and we say that
-epic if every embedding of
-epic. We continue this investigation. Our most notable result shows that a Lindelöf space
-epic if a countable intersection of
. This condition is stable under countable sums, the formation of closed subspaces, cozero-subspaces, and being the domain or codomain of a perfect map. A strengthening of the Lindelöf property leads to a new class with the same closure properties that is also closed under finite products. Moreover, all
-compact spaces and all Lindelöf
-spaces satisfy this stronger condition. We get some results in the non-Lindelöf case that are sufficient to show that the Dieudonné plank and some closely related spaces are absolute
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