Anomalous Subvarieties-Structure Theorems and Applications

被引：55

作者：

Bombieri, E. ^{[1
]}

Masser, D. ^{[2
]}

Zannier, U. ^{[3
]}

机构：

[1] Inst Adv Study, Sch Math, Princeton, NJ 08540 USA

[2] Univ Basel, Math Inst, CH-4051 Basel, Switzerland

[3] Scuola Normale Super Pisa, I-56126 Pisa, Italy

来源：

INTERNATIONAL MATHEMATICS RESEARCH NOTICES | 2007年 / 2007卷

关键词：

D O I：

10.1093/imrn/rnm057

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

When a fixed algebraic variety in a multiplicative group variety is intersected with the union of all algebraic subgroups of fixed dimension, a key role is played by what we call the anomalous subvarieties. These arise when the algebraic variety meets translates of subgroups in sets larger than expected. We prove a Structure Theorem for the anomalous subvarieties, and we give some applications, emphasizing in particular the case of codimension two. We also state some related conjectures about the boundedness of absolute height on such intersections as well as their finiteness.

引用

页数：33

共 25 条

[1]

Amoroso F., 2000, ANN SCUOLA NORM SUP, V29, P711

[2]

[Anonymous], 1969, ACTA ARITH, V16, P123

[3]

[Anonymous], LONDON MATH SOC LECT

[4] SCHANUELS CONJECTURES [J].

AX, J .

ANNALS OF MATHEMATICS, 1971, 93 (02) :252-&

[5] Intersecting curves and algebraic subgroups: Conjectures and more results [J].

Bombieri, E ;

Masser, D ;

Zannier, U .

TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 2006, 358 (05) :2247-2257

[6]

Bombieri E, 2003, MICH MATH J, V51, P451

[7]

Bombieri E, 1999, INT MATH RES NOTICES, V1999, P1119

[8]

Bombieri E., 1995, Internat. Math. Res. Notices, P333

[9]

BOMBIERI E, 2006, INTERSECTING PLANE A

[10]

Bombieri E., 2006, Heights in Diophantine Geometry, V4

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