Results 271 to 280 of about 162,218 (329)
Vagal afferent projections from the pharyngeal jaw of the cichlid Nile tilapia (<i>Oreochromis niloticus</i>). [PDF]
Eur J HistochemImura K +4 more
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Cortical white matter: no longer a silent partner. [PDF]
Front NeuroanatRockland KS, Rushmore RJ.
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On the Meaning of Local Symmetries: Epistemic-ontological Dialectics. [PDF]
Found PhysFrançois J, Ravera L.
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Improved Statistics for F-theory Standard Models. [PDF]
Commun Math PhysBies M, Cvetič M, Donagi R, Ong M.
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Mixed Hodge structures and vector bundles on the projective Plane I
, 2005 Olivier Penacchio
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Russian Physics Journal, 2002
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Buchbinder, E., Ovrut, Burt A.
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Buchbinder, E., Ovrut, Burt A.
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Vector Bundles Over Suspensions
Canadian Mathematical Bulletin, 1974We consider finite dimensional complex vector bundles over a compact connected Hausdorff space X, as defined, for example, in [1]. It is well known that if ξ is such a bundle, then there is a bundle η such that ξ⊕η is trivial.
Chan, W. M., Hoffman, P.
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International Journal of Mathematics, 1992
Let \(X\) be a smooth projective variety over \(\mathbb{C}\) of dimension \(n\geq 4\) and \(E\) be an ample vector bundle on \(X\) of rank \(n-1\). The authors discuss the isomorphism classes of \((X,E)\) in terms of properties of the divisor \(K_ X+\text{det} E\).
Andreatta, Marco +2 more
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Let \(X\) be a smooth projective variety over \(\mathbb{C}\) of dimension \(n\geq 4\) and \(E\) be an ample vector bundle on \(X\) of rank \(n-1\). The authors discuss the isomorphism classes of \((X,E)\) in terms of properties of the divisor \(K_ X+\text{det} E\).
Andreatta, Marco +2 more
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The Quarterly Journal of Mathematics, 1994
The authors study the map \([X,S^n] \to \Hom (E(X)/ \text{Tors}, E(S^n)/\text{Tors}) \to E(S^n)/ \text{Tors} \approxeq \mathbb{Z}\) for which the first map is a Hurewicz map for a homology functor, \(E\), the second is evaluation at a fixed element and the final isomorphism is given.
Ōshima, Hideaki, Sasao, Seiya
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The authors study the map \([X,S^n] \to \Hom (E(X)/ \text{Tors}, E(S^n)/\text{Tors}) \to E(S^n)/ \text{Tors} \approxeq \mathbb{Z}\) for which the first map is a Hurewicz map for a homology functor, \(E\), the second is evaluation at a fixed element and the final isomorphism is given.
Ōshima, Hideaki, Sasao, Seiya
openaire +1 more source