Chow ring and gonality of general abelian varieties

Voisin, Claire

doi:10.5802/ahl.10

Chow ring and gonality of general abelian varieties
[Anneau de Chow et gonalité des variétés abéliennes générales]

Voisin, Claire ¹

¹ Collège de France 3 rue d’Ulm 75005 Paris (France)

Annales Henri Lebesgue, Tome 1 (2018), pp. 313-332.

Résumé
Abstract

Nous étudions la gonalité des variétés abéliennes ainsi que leurs orbites de zéro-cycles pour l’équivalence rationnelle. Nous montrons que l’orbite d’un zéro-cycle de degré $k$ est de dimension au plus $k - 1$ . En développant des idées de Pirola, nous montrons qu’une variété abélienne très générale a une gonalité au moins égale à $f (g)$ , où $f (g)$ croît comme $\log g$ . Ceci répond à une question posée par Bastianelli, De Poi, Ein, Lazarsfeld et B. Ullery. Nous obtenons aussi des résultats sur l’anneau de Chow des variétés abéliennes $A$ de dimension $g$ ; par exemple, si $g \geq 2 k - 1$ , l’ensemble des diviseurs $D \in {Pic}^{0} (A)$ tels que $D^{k} = 0$ dans ${CH}^{k} (A)$ est au plus dénombrable.

We study the (covering) gonality of abelian varieties and their orbits of zero-cycles for rational equivalence. We show that any orbit for rational equivalence of zero-cycles of degree $k$ has dimension at most $k - 1$ . Building on the work of Pirola, we show that very general abelian varieties of dimension $g$ have (covering) gonality at least $f (g)$ , where $f (g)$ grows like $\log g$ . This answers a question asked by Bastianelli, De Poi, Ein, Lazarsfeld and B. Ullery. We also obtain results on the Chow ring of very general abelian varieties $A$ of dimension $g$ , e.g., if $g \geq 2 k - 1$ , the set of divisors $D \in {Pic}^{0} (A)$ such that $D^{k} = 0$ in ${CH}^{k} (A)$ is at most countable.

Reçu le : 2018-02-26
Révisé le : 2018-10-12
Accepté le : 2018-12-04
Publié le : 2019-03-29

MR Zbl

DOI : 10.5802/ahl.10

Classification : 14K12, 14C25
Mots-clés : Abelian varieties, covering gonality, zero-cycles, Chow ring

Affiliations des auteurs :

Voisin, Claire ¹

¹ Collège de France 3 rue d’Ulm 75005 Paris (France)

@article{AHL_2018__1__313_0,
     author = {Voisin, Claire},
     title = {Chow ring and gonality of general abelian varieties},
     journal = {Annales Henri Lebesgue},
     pages = {313--332},
     publisher = {\'ENS Rennes},
     volume = {1},
     year = {2018},
     doi = {10.5802/ahl.10},
     mrnumber = {3963294},
     zbl = {07099972},
     language = {en},
     url = {http://www.numdam.org/articles/10.5802/ahl.10/}
}

TY  - JOUR
AU  - Voisin, Claire
TI  - Chow ring and gonality of general abelian varieties
JO  - Annales Henri Lebesgue
PY  - 2018
SP  - 313
EP  - 332
VL  - 1
PB  - ÉNS Rennes
UR  - http://www.numdam.org/articles/10.5802/ahl.10/
DO  - 10.5802/ahl.10
LA  - en
ID  - AHL_2018__1__313_0
ER  -

%0 Journal Article
%A Voisin, Claire
%T Chow ring and gonality of general abelian varieties
%J Annales Henri Lebesgue
%D 2018
%P 313-332
%V 1
%I ÉNS Rennes
%U http://www.numdam.org/articles/10.5802/ahl.10/
%R 10.5802/ahl.10
%G en
%F AHL_2018__1__313_0

Voisin, Claire. Chow ring and gonality of general abelian varieties. Annales Henri Lebesgue, Tome 1 (2018), pp. 313-332. doi : 10.5802/ahl.10. http://www.numdam.org/articles/10.5802/ahl.10/

Bibliographie
Cité par

[AP93] Alzati, Alberto; Pirola, Gian P. Rational orbits on three-symmetric products of abelian varieties, Trans. Am. Math. Soc., Volume 337 (1993) no. 2, pp. 965-980 | DOI | MR | Zbl

[BDPE + 17] Bastianelli, Francesco; De Poi, Pietro; Ein, Lawrence; Lazarsfeld, Robert; Ullery, Brooke Measures of irrationality for hypersurfaces of large degree, Compos. Math., Volume 153 (2017) no. 11, pp. 2368-2393 | DOI | MR | Zbl

[Bea82] Beauville, Arnaud Quelques remarques sur la transformation de Fourier dans l’anneau de Chow d’une variété abélienne, Algebraic geometry (Tokyo/Kyoto, 1982) (Lecture Notes in Mathematics), Volume 1016, Springer, 1982, pp. 238-260 | DOI | Zbl

[Bea83] Beauville, Arnaud Variétés kählériennes dont la première classe de Chern est nulle, J. Differ. Geom., Volume 18 (1983) no. 4, pp. 755-782 | DOI | Zbl

[Blo76] Bloch, Spencer Some elementary theorems about algebraic cycles on Abelian varieties, Invent. Math., Volume 37 (1976) no. 3, pp. 215-228 | DOI | MR | Zbl

[CvG93] Colombo, Elisabetta; van Geemen, Bert Note on curves in a Jacobian, Compos. Math., Volume 88 (1993) no. 3, pp. 333-353 | Numdam | MR | Zbl

[Her07] Herbaut, Fabien Algebraic cycles on the Jacobian of a curve with a linear system of given dimension, Compos. Math., Volume 143 (2007) no. 4, pp. 883-899 | DOI | MR | Zbl

[Huy14] Huybrechts, Daniel Curves and cycles on K3 surfaces, Algebr. Geom., Volume 1 (2014) no. 1, pp. 69-106 | MR | Zbl

[Mat58] Mattuck, Arthur Cycles on abelian varieties, Proc. Am. Math. Soc., Volume 9 (1958), pp. 88-98 | DOI | MR | Zbl

[Mum69] Mumford, David Rational equivalence of 0-cycles on surfaces, J. Math. Kyoto Univ., Volume 9 (1969), pp. 195-204 | DOI | MR | Zbl

[MZ17] Marian, Alina; Zhao, Xiaolei On the group of zero-cycles of holomorphic symplectic varieties (2017) (https://arxiv.org/abs/1711.10045)

[Pir89] Pirola, Gian P. Curves on generic Kummer varieties, Duke Math. J., Volume 59 (1989), pp. 701-708 | DOI | MR | Zbl

[Pir95] Pirola, Gian P. Abel-Jacobi invariant and curves on generic abelian varieties, Abelian varieties (Egloffstein, 1993), Walter de Gruyter, 1995, pp. 237-249 | MR | Zbl

[Voi92] Voisin, Claire Sur les zéro-cycles de certaines hypersurfaces munies d’un automorphisme, Ann. Sc. Norm. Super. Pisa, Cl. Sci., Volume 19 (1992) no. 4, pp. 473-492 | Zbl

[Voi15a] Voisin, Claire Rational equivalence of 0-cycles on K3 surfaces and conjectures of Huybrechts and O’Grady, Recent advances in algebraic geometry (London Mathematical Society Lecture Note Series), Volume 417, Cambridge University Press, 2015, pp. 422-436 | DOI | MR | Zbl

[Voi15b] Voisin, Claire Some new results on modified diagonals, Geom. Topol., Volume 19 (2015) no. 6, pp. 3307-3343 | DOI | MR | Zbl

[Voi16] Voisin, Claire Rational equivalence of 0-cycles on K3 surfaces and conjectures of Huybrechts and O’Grady, K3 surfaces and their moduli (Progress in Mathematics), Birkhäuser/Springer, 2016, pp. 365-399 | Zbl

Cité par Sources :