Complete addition laws on abelian varieties
We prove that under any projective embedding of an abelian variety A of dimension g, a complete system of addition laws has cardinality at least g+1, generalizing of a result of Bosma and Lenstra for the Weierstrass model of an elliptic curve in P^2. In contrast with this geometric constraint, we mo...
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| Main Authors | , , |
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| Format | Journal Article |
| Language | English |
| Published |
11.02.2011
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| Subjects | |
| Online Access | Get full text |
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| Summary: | We prove that under any projective embedding of an abelian variety A of
dimension g, a complete system of addition laws has cardinality at least g+1,
generalizing of a result of Bosma and Lenstra for the Weierstrass model of an
elliptic curve in P^2. In contrast with this geometric constraint, we moreover
prove that if k is any field with infinite absolute Galois group, then there
exists, for every abelian variety A/k, a projective embedding and an addition
law defined for every pair of k-rational points. For an abelian variety of
dimension 1 or 2, we show that this embedding can be the classical Weierstrass
model or embedding in P^15, respectively, up to a finite number of
counterexamples for |k| less or equal to 5. |
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| DOI: | 10.48550/arxiv.1102.2349 |