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Effective results for points on certain subvarieties of tori

Published online by Cambridge University Press:  01 July 2009

ATTILA BÉRCZES ,
KÁLMÁN GYŐRY ,
JAN-HENDRIK EVERTSE  and
CORENTIN PONTREAU
ATTILA BÉRCZES
Affiliation:
Institute of Mathematics, University of Debrecen, Number Theory Research Group, Hungarian Academy of Sciences and University of Debrecen, H-4010 Debrecen, P.O. Box 12, Hungary. e-mail: berczesa@math.klte.hu, gyory@math.klte.hu
KÁLMÁN GYŐRY
Affiliation:
Institute of Mathematics, University of Debrecen, Number Theory Research Group, Hungarian Academy of Sciences and University of Debrecen, H-4010 Debrecen, P.O. Box 12, Hungary. e-mail: berczesa@math.klte.hu, gyory@math.klte.hu
JAN-HENDRIK EVERTSE
Affiliation:
Universiteit Leiden, Mathematisch Instituut, Postbus 9512, 2300 RA Leiden, The Netherlands. e-mail: evertse@math.leidenuniv.nl
CORENTIN PONTREAU
Affiliation:
Laboratoire de Mathématiques Nicolas Oresme CNRS UMR 6139, Université de Caen, 14032 Caen cedex, France. e-mail: pontreau@math.unicaen.fr
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Abstract

The combined conjecture of Lang-Bogomolov for tori gives an accurate description of the set of those points x of a given subvariety of , that with respect to the height are “very close” to a given subgroup Γ of finite rank of . Thanks to work of Laurent, Poonen and Bogomolov, this conjecture has been proved in a more precise form.

In this paper we prove, for certain special classes of varieties , effective versions of the Lang-Bogomolov conjecture, giving explicit upper bounds for the heights and degrees of the points x under consideration. The main feature of our results is that the points we consider do not have to lie in a prescribed number field. Our main tools are Baker-type logarithmic forms estimates and Bogomolov-type estimates for the number of points on the variety with very small height.

Type
Research Article
Information
Mathematical Proceedings of the Cambridge Philosophical Society , Volume 147 , Issue 1 , July 2009 , pp. 69 - 94
Copyright
Copyright © Cambridge Philosophical Society 2009

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References

REFERENCES

[1]Bérczes, A., Evertse, J.-H. and Györy, K. Effective results for linear equations in two unknowns from a multiplicative division group. Acta Arith., to appear.Google Scholar
[2]Beukers, F. and Zagier, D.Lower bounds of heights of points on hypersurfaces. Acta Arith. 79 (1997), 103111.CrossRefGoogle Scholar
[3]Bombieri, E. and Gubler, W.Heights in Diophantine Geometry (Cambridge University Press, 2006).Google Scholar
[4]Bombieri, E. and Zannier, U.Algebraic points on subvarieties of , Internat. Math. Res. Notices 7 (1995), 333347.CrossRefGoogle Scholar
[5]Borosh, I., Flahive, M., Rubin, D. and Treybig, B.A sharp bound for solutions of linear Diophantine equations. Proc. Amer. Math. Soc. 105 (1989), 844846.CrossRefGoogle Scholar
[6]David, S. and Philippon, P.Minorations des hauteurs normalisées des sous-variétés de variétés abeliennes. II. Comment. Math. Helv. 77 (2002), 639700.Google Scholar
[7]Evertse, J.-H. Points on subvarieties of tori. In: A panorama of number theory or the view from Baker's garden (Zürich, 1999) (Cambridge University Press, 2002), pp. 214230.CrossRefGoogle Scholar
[8]Laurent, M.Equations diophantiennes exponentielles. Invent. Math. 78 (1984), 299327.CrossRefGoogle Scholar
[9]Liardet, P.Sur une conjecture de Serge Lang. Astérisque 24–25, (1975), 187210.Google Scholar
[10]Pontreau, C. Petits points d'une surface. Canad J. of Math., to appear.Google Scholar
[11]Pontreau, C. A Mordell–Lang plus Bogolomov type result for curves in . Monatsh. Math. to appear.Google Scholar
[12]Poonen, B.Mordell–Lang plus Bogomolov. Invent. Math. 137 (1999), 413425.CrossRefGoogle Scholar
[13]Rémond, G.Sur les sous-variétés des tores. Compositio Math. 134 (2002), 337366.CrossRefGoogle Scholar
[14]Schlickewei, H. P.Lower bounds for heights on finitely generated groups. Monatsh. Math. 123 (1997), 171178.CrossRefGoogle Scholar
[15]Schmidt, W. M. Heights of points on subvarieties of . In Number Theory (Paris, 1993–1994), London Math. Soc. Lecture Note Ser. 235 (Cambridge University Press, 1996), 157187.CrossRefGoogle Scholar
[16]Voutier, P.An effective lower bound for the height of algebraic numbers. Acta Arith. 74 (1996), 8195.Google Scholar
[17]Zhang, S.Positive line bundles on arithmetic varieties. J. Amer. Math. Soc. 8 (1995), 187221.Google Scholar