Titlebook: On the Geometry of Some Special Projective Varieties; Francesco Russo Book 2016 Springer International Publishing Switzerland 2016 14N05,1

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978-3-319-26764-7Springer International Publishing Switzerland 2016

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einer Ausdruckshermeneutik interkorporaler Symbolik reformulieren (vgl. Brinkmann 2017). Damit wird die Frage nach dem Fremdverstehen als Verstehen Anderer wieder aufgegriffen. Fremdverstehen wird zun?chst sowohl von Theorien der Einfühlung (Lipps) als auch von hermeneutischen Zug?ngen abgegrenzt. M

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Francesco Russo in dieser Untersuchung zun?chst die einzigartige, komplexe Geschichte und ethnischen Ursprünge Südafrikas, ohne deren grundlegende Kenntnis auch die gesamte politische und sozio?konomische Situation der heutigen Republik Südafrika gar nicht verstanden werden kann, in geraffter Form dargestellt und

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The Hilbert Scheme of Lines Contained in a Variety and Passing Through a General Point,operties of these parameter spaces. Then we introduce and study in great detail the Hilbert scheme of lines passing through a (general) point .?∈?. of a projective variety . and contained in it, indicated by .. We included all the details and proofs concerning the geometrical properties of . inherit

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,The Fulton–Hansen Connectedness Theorem, Scorza’s Lemma and Their Applications to Projective Geometme deep generalizations are reported following the circle of ideas which led to the Connectedness Theorem of Fulton–Hansen and to some new results related to it. We include a proof of the Fulton–Hansen Theorem according to Deligne and we describe its consequences for the geometry of embedded project

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Local Quadratic Entry Locus Manifolds and Conic Connected Manifolds,nt defect of ., respectively the union of quadric hypersurfaces of dimension equal to the secant defect of .. We present the main results of the theory of .-manifolds introduced in Russo (Math. Ann. 344:597–617, 2009), leading to the Divisibility Theorem for the secant defect of .-manifolds. The mai

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Hartshorne Conjectures and Severi Varieties,present Zak’s proof of the Linear Normality Conjecture and we formalize the definition of Severi Variety from this perspective. In Sect.?5.2 we prove all the tools needed for the proof of Hartshorne’s Conjecture for quadratic manifolds, presented in Theorem?5.1.3 and of the classification of the qua

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