In arithmetic geometry, the Mordell–Weil group is an abelian group associated to any abelian variety defined over a number field , it is an arithmetic invariant of the Abelian variety. It is simply the group of -points of , so is the Mordell–Weil group[1][2]pg 207. The main structure theorem about this group is the Mordell–Weil theorem which shows this group is in fact a finitely-generated abelian group. Moreover, there are many conjectures related to this group, such as the Birch and Swinnerton-Dyer conjecture which relates the rank of to the zero of the associated L-function at a special point.
Examples
Constructing[3] explicit examples of the Mordell–Weil group of an abelian variety is a non-trivial process which is not always guaranteed to be successful, so we instead specialize to the case of a specific elliptic curve . Let be defined by the Weierstrass equation
over the rational numbers. It has discriminant (and this polynomial can be used to define a global model ). It can be found[3]
through the following procedure. First, we find some obvious torsion points by plugging in some numbers, which are
In addition, after trying some smaller pairs of integers, we find is a point which is not obviously torsion. One useful result for finding the torsion part of is that the torsion of prime to , for having good reduction to , denoted injects into , so
We check at two primes and calculate the cardinality of the sets
note that because both primes only contain a factor of , we have found all the torsion points. In addition, we know the point has infinite order because otherwise there would be a prime factor shared by both cardinalities, so the rank is at least . Now, computing the rank is a more arduous process consisting of calculating the group where using some long exact sequences from homological algebra and the Kummer map.
Theorems concerning special cases
There are many theorems in the literature about the structure of the Mordell–Weil groups of abelian varieties of specific dimension, over specific fields, or having some other special property.
Abelian varieties over the rational function field k(t)
For a hyperelliptic curve and an abelian variety defined over a fixed field , we denote the the twist of (the pullback of to the function field ) by a 1-cocyle
for Galois cohomology of the field extension associated to the covering map . Note which follows from the map being hyperelliptic. More explicitly, this 1-cocyle is given as a map of groups
which using universal properties is the same as giving two maps , hence we can write it as a map
where is the inclusion map and is sent to negative . This can be used to define the twisted abelian variety defined over using general theory of algebraic geometry[4]pg 5. In particular, from universal properties of this construction, is an abelian variety over which is isomorphic to after base-change to .
Theorem
For the setup given above,[5] there is an isomorphism of abelian groups
where is the Jacobian of the curve , and is the 2-torsion subgroup of .
See also
References
- ↑ Tate, John T. (1974-09-01). "The arithmetic of elliptic curves". Inventiones Mathematicae. 23 (3): 179–206. Bibcode:1974InMat..23..179T. doi:10.1007/BF01389745. ISSN 1432-1297. S2CID 120008651.
- ↑ Silverman, Joseph H., 1955– (2009). The arithmetic of elliptic curves (2nd ed.). New York: Springer-Verlag. ISBN 978-0-387-09494-6. OCLC 405546184.
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: CS1 maint: multiple names: authors list (link) CS1 maint: numeric names: authors list (link) - 1 2 Booher, Jeremy. "The Mordell–Weil theorem for elliptic curves" (PDF). Archived (PDF) from the original on 27 Jan 2021.
- ↑ Weil, André, 1906-1998. (1982). "1.3". Adeles and algebraic groups. Boston: Birkhäuser. ISBN 978-1-4684-9156-2. OCLC 681203844.
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: CS1 maint: multiple names: authors list (link) CS1 maint: numeric names: authors list (link) - ↑ Hazama, Fumio (1992). "The Mordell–Weil group of certain abelian varieties defined over the rational function field". Tohoku Mathematical Journal. 44 (3): 335–344. doi:10.2748/tmj/1178227300. ISSN 0040-8735.