| 翻訳と辞書 |
| Theta divisor : ウィキペディア英語版 |
Theta divisor
In mathematics, the theta divisor Θ is the divisor in the sense of algebraic geometry defined on an abelian variety ''A'' over the complex numbers (and principally polarized) by the zero locus of the associated Riemann theta-function. It is therefore an algebraic subvariety of ''A'' of dimension dim ''A'' − 1.
==Classical theory==
Classical results of Bernhard Riemann describe Θ in another way, in the case that ''A'' is the Jacobian variety ''J'' of an algebraic curve (compact Riemann surface) ''C''. There is, for a choice of base point ''P'' on ''C'', a standard mapping of ''C'' to ''J'', by means of the interpretation of ''J'' as the linear equivalence classes of divisors on ''C'' of degree 0. That is, ''Q'' on ''C'' maps to the class of ''Q'' − ''P''. Then since ''J'' is an algebraic group, ''C'' may be added to itself ''k'' times on ''J'', giving rise to subvarieties ''W''''k''.
If ''g'' is the genus of ''C'', Riemann proved that Θ is a translate on ''J'' of ''W''''g'' − 1. He also described which points on ''W''''g'' − 1 are non-singular: they correspond to the effective divisors ''D'' of degree ''g'' − 1 with no associated meromorphic functions other than constants. In more classical language, these ''D'' do not move in a linear system of divisors on ''C'', in the sense that they do not dominate the polar divisor of a non constant function.
Riemann further proved the Riemann singularity theorem, identifying the multiplicity of a point p = class(D) on ''W''''g'' − 1 as the number of linearly independent meromorphic functions with pole divisor dominated by D, or equivalently as ''h''0(O(D)), the number of linearly independent global sections of the holomorphic line bundle associated to ''D'' as Cartier divisor on ''C''.
抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)』
■ウィキペディアで「Theta divisor」の詳細全文を読む
スポンサード リンク
| 翻訳と辞書 : 翻訳のためのインターネットリソース |
Copyright(C) kotoba.ne.jp 1997-2016. All Rights Reserved.
|
|