Spherical sector: Difference between revisions

Revision as of 19:05, 1 February 2014

In mathematics, an essentially finite vector bundle is a particular type of vector bundle defined by Madhav Nori,^[1]^[2] as the main tool in the construction of the fundamental group scheme. Even if the definition is not intuitive there is a nice characterization that makes essentially finite vector bundles quite natural objects to study in algebraic geometry. So before recalling the definition we give this characterization:

Characterization

Let $X$ be a reduced and connected scheme over a perfect field $k$ endowed with a section $x\in X(k)$ . Then a vector bundle $V$ over $X$ is essentially finite if and only if there exists a finite $k$ -group scheme $G$ and a $G$ -torsor $p:P\to X$ such that $V$ becomes trivial over $P$ (i.e. $p^{*}(V)\cong O_{P}^{\oplus r}$ , where $r=rk(V)$ ).

Definition

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Notes

↑ M. V. Nori On the Representations of the Fundamental Group, Compositio Mathematica, Vol. 33, Fasc. 1, (1976), p. 29–42
↑ T. Szamuely Galois Groups and Fundamental Groups. Cambridge Studies in Advanced Mathematics, Vol. 117 (2009)

[1] M. V. Nori On the Representations of the Fundamental Group, Compositio Mathematica, Vol. 33, Fasc. 1, (1976), p. 29–42

[2] T. Szamuely Galois Groups and Fundamental Groups. Cambridge Studies in Advanced Mathematics, Vol. 117 (2009)

[1]

[2]

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+In mathematics, an '''essentially finite vector bundle''' is a particular type of [[vector bundle]] defined by Madhav Nori,<ref>M. V. Nori ''On the Representations of the Fundamental Group'', Compositio Mathematica, Vol. 33, Fasc. 1, (1976), p. 29–42</ref><ref>T. Szamuely ''Galois Groups and Fundamental Groups.'' Cambridge Studies in Advanced Mathematics, Vol. 117 (2009)</ref> as the main tool in the construction of the [[fundamental group scheme]].  Even if the definition is not intuitive there is a nice characterization that makes essentially finite vector bundles quite natural objects to study in [[algebraic geometry]]. So before recalling the definition we give this characterization:
+==Characterization==
+Let <math>X</math> be a reduced and connected [[Scheme (mathematics)|scheme]] over a perfect [[field (mathematics)|field]] <math>k</math> endowed with a section <math>x\in X(k)</math>.  Then a vector bundle <math>V</math> over <math>X</math> is essentially finite if and only if there exists a [[Finite morphism|finite]] <math>k</math>-[[group scheme]] <math>G</math> and a <math>G</math>-[[torsor]]  <math>p:P\to X</math> such that <math>V</math> becomes trivial over <math>P</math> (i.e. <math>p^*(V)\cong O_P^{\oplus r}</math>, where <math>r=rk(V)</math>).
+==Definition==
+{{Empty section|date=October 2012}}
+==Notes==
+<references/>
+[[Category:Scheme theory]]
+[[Category:Topological methods of algebraic geometry]]

Spherical sector: Difference between revisions

Revision as of 19:05, 1 February 2014

Characterization

Definition

Notes

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