Models of Genus One Curves

Models of Genus One Curves

LAP Lambert Academic Publishing ( 13.09.2010 )

€ 59,00

Купить в магазине MoreBooks!

Let E be an elliptic curve defined over a number field K. An element of the n-Selmer group of E can be represented as a geometric object. Namely, as an everywhere locally soluble genus one curve defined by an equation of degree n. This equation is a generalised binary quartic when n=2, a ternary cubic when n=3, and two quadrics in four variables when n=4. By minimising these equations we mean making their invariants as small as possible. Unfortunately, the minimal (with the smallest invariants) equations of degree n are not unique in general. We exploit the theory of minimal regular models to find an alternative definition of minimality. Then we use this new definition to count the minimal equations of degree n.

Детали книги:

ISBN-13:

978-3-8433-5384-7

ISBN-10:

3843353840

EAN:

9783843353847

Язык книги:

English

By (author) :

Mohammad Sadek

Количество страниц:

124

Опубликовано:

13.09.2010

Категория:

Геометрия