Conductor of an abelian variety
In mathematics, in Diophantine geometry, the conductor of an abelian variety defined over a local or global field F is a measure of how "bad" the bad reduction at some prime is. It is connected to the ramification in the field generated by the torsion points.
Definition
For an abelian variety A defined over a field F as above, with ring of integers R, consider the Néron model of A, which is a 'best possible' model of A defined over R. This model may be represented as a scheme over
- Spec(R)
(cf. spectrum of a ring) for which the generic fibre constructed by means of the morphism
- Spec(F) → Spec(R)
gives back A. Let A0 denote the open subgroup scheme of the Néron model whose fibres are the connected components. For a maximal ideal P of R with residue field k, A0k is a group variety over k, hence an extension of an abelian variety by a linear group. This linear group is an extension of a torus by a unipotent group. Let uP be the dimension of the unipotent group and tP the dimension of the torus. The order of the conductor at P is
where is a measure of wild ramification. When F is a number field, the conductor ideal of A is given by
Properties
- A has good reduction at P if and only if (which implies ).
- A has semistable reduction if and only if (then again ).
- If A acquires semistable reduction over a Galois extension of F of degree prime to p, the residue characteristic at P, then δP = 0.
- If , where d is the dimension of A, then .
- If and F is a finite extension of of ramification degree , there is an upper bound expressed in terms of the function , which is defined as follows:
- Write with and set . Then[1]
- Further, for every with there is a field with and an abelian variety of dimension so that is an equality.
References
- Brumer, Armand; Kramer, Kenneth (1994). "The conductor of an abelian variety". Compositio Math. 92 (2): 227-248.
- S. Lang (1997). Survey of Diophantine geometry. Springer-Verlag. pp. 70–71. ISBN 3-540-61223-8.
- J.-P. Serre; J. Tate (1968). "Good reduction of Abelian varieties". Ann. Math. The Annals of Mathematics, Vol. 88, No. 3. 88 (3): 492–517. doi:10.2307/1970722. JSTOR 1970722.