Jacobians: Difference between revisions
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The Jacobian variety of a smooth [[algebraic curve]] C is the variety of degree 0 divisors of C, up to [[ratinal equivalence]]; i.e. it is the kernel of the degree map from Pic(C) to the integers; sometimes also denoted as Pic<sup>0</sup>. It is an principally polarized [[Abelian variety]] of dimension g. | The Jacobian variety of a smooth [[algebraic curve]] C is the variety of degree 0 divisors of C, up to [[ratinal equivalence]]; i.e. it is the kernel of the degree map from Pic(C) to the integers; sometimes also denoted as Pic<sup>0</sup>. It is an principally polarized [[Abelian variety]] of dimension g. | ||
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* [[Abels theorem]] states that the map <math>\mathcal{M}_g\to\mathcal{A}_g</math>, which takes a curve to it's jacobian is an injection. | * [[Abels theorem]] states that the map <math>\mathcal{M}_g\to\mathcal{A}_g</math>, which takes a curve to it's jacobian is an injection. | ||
* The [[Shottcky problem]] calls for the classification of the map above. | * The [[Shottcky problem]] calls for the classification of the map above. | ||
Revision as of 19:13, 29 April 2009
The Jacobian variety of a smooth algebraic curve C is the variety of degree 0 divisors of C, up to ratinal equivalence; i.e. it is the kernel of the degree map from Pic(C) to the integers; sometimes also denoted as Pic0. It is an principally polarized Abelian variety of dimension g.
Principal polarization: The pricipal polarization of the Jacobian variety is given by the theta divisor: some shift from Picg-1 to to Jacobian of the image of Symg-1C in Picg-1.
Examples:
- A genus 1 curve is naturally ismorphic to the variety of degree 1 divisors, and therefor to is isomorphic to it's Jacobian.
Related theorems and problems:
- Abels theorem states that the map , which takes a curve to it's jacobian is an injection.
- The Shottcky problem calls for the classification of the map above.
