Height one specializations of Selmer groups

Palvannan, Bharathwaj

doi:10.5802/aif.3244

Geodesic

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Height one specializations of Selmer groups
[Spécialisations de hauteur un des groupes de Selmer]

Palvannan, Bharathwaj ¹

¹ Department of Mathematics University of Pennsylvania 209 South 33rd Street, 4N53 DRL Philadelphia 19104-6395 (USA)

Annales de l'Institut Fourier, Tome 69 (2019) no. 1, pp. 303-334.

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Abstract (VO)
Résumé

We provide applications to studying the behavior of Selmer groups under specialization. We consider Selmer groups associated to $4$ -dimensional Galois representations coming from

(i) the tensor product of two cuspidal Hida families $F$ and $G$ ,
(ii) its cyclotomic deformation,
(iii) the tensor product of a cusp form $f$ and the Hida family $G$ , where $f$ is a classical specialization of $F$ with weight $k \geq 2$ .

We prove control theorems to relate

(a) the Selmer group associated to the tensor product of Hida families $F$ and $G$ to the Selmer group associated to its cyclotomic deformation, and
(b) the Selmer group associated to the tensor product of $f$ and $G$ to the Selmer group associated to the tensor product of $F$ and $G$ .

On the analytic side of the main conjectures, Hida has constructed one variable, two variable and three variable Rankin–Selberg $p$ -adic $L$ -functions. Our specialization results enable us to verify that Hida’s results relating

(a) the two variable $p$ -adic $L$ -function to the three variable $p$ -adic $L$ -function, and
(b) the one variable $p$ -adic $L$ -function to the two variable $p$ -adic $L$ -function,

and our control theorems for Selmer groups are completely consistent with the main conjectures.

Nous donnons des applications de l’étude du comportement des groupes de Selmer sous la spécialisation. Nous considérons les groupes de Selmer associés à de représentations galoisiennes de dimension $4$ provenant

(i) du produit tensoriel de deux familles cuspidales de Hida $F$ et $G$ ,
(ii) de la déformation cyclotomique du dernier,
(iii) du produit tensoriel d’une forme cuspidale $f$ par une famille de Hida $G$ , où $f$ est une spécialisation classique de $F$ de poids $k \geq 2$ .

Nous démontrons des théorèmes de contrôle qui relient

(a) le groupe de Selmer associé au produit tensoriel des familles de Hida $F$ et $G$ au groupe de Selmer associé à sa déformation cyclotomique,
(b) le groupe de Selmer associé au produit tensoriel de $f$ par $G$ au groupe de Selmer associé au produit tensoriel de $F$ et $G$ .

Du côté analytique des conjectures principales, Hida a construit des fonctions $L$ $p$ -adiques de Rankin–Selberg à une variable, à deux variables et à trois variables. Nos résultats sur la spécialisation nous permettent de vérifier les résultats de Hida qui relient

(a) la fonction $L$ $p$ -adique à deux variables à la fonction $L$ $p$ -adique à trois variables, et
(b) la fonction $L$ $p$ -adique à une variables à la fonction $L$ $p$ -adique à deux variables,

et nos théorèmes de contrôle pour les groupes de Selmer sont complètement compatibles avec les conjectures principales.

Reçu le : 2016-08-22
Révisé le : 2017-09-19
Accepté le : 2018-02-02
Publié le : 2019-06-03

DOI : 10.5802/aif.3244

Classification : 11R23, 11F33, 11F80
Keywords: Iwasawa theory, Hida theory, Selmer groups
Mots-clés : théorie d’Iwasawa, théorie de Hida, groupes de Selmer

Affiliations des auteurs :

Palvannan, Bharathwaj ¹

¹ Department of Mathematics University of Pennsylvania 209 South 33rd Street, 4N53 DRL Philadelphia 19104-6395 (USA)

Licence :

CC-BY-ND 4.0

Droits d'auteur : Les auteurs conservent leurs droits

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     publisher = {Association des Annales de l{\textquoteright}institut Fourier},
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Palvannan, Bharathwaj. Height one specializations of Selmer groups. Annales de l'Institut Fourier, Tome 69 (2019) no. 1, pp. 303-334. doi : 10.5802/aif.3244. http://geodesic.mathdoc.fr/articles/10.5802/aif.3244/

Bibliographie
Cité par

[1] Böckle, Gebhard On the density of modular points in universal deformation spaces, Am. J. Math., Volume 123 (2001) no. 5, pp. 985-1007 | MR | DOI | Zbl

[2] Cho, Sheena Deformation rings for induced Galois representations, University of California, Los Angeles (USA) (1999) (Ph. D. Thesis) | MR

[3] Cho, Sheena; Vatsal, Vinayak Deformations of induced Galois representations, J. Reine Angew. Math., Volume 556 (2003), pp. 79-98 | MR | DOI | Zbl

[4] Emerton, Matthew; Pollack, Robert; Weston, Tom Variation of Iwasawa invariants in Hida families, Invent. Math., Volume 163 (2006) no. 3, pp. 523-580 | MR | DOI | Zbl

[5] Gouvêa, Fernando Q. Deforming Galois representations: controlling the conductor, J. Number Theory, Volume 34 (1990) no. 1, pp. 95-113 | MR | DOI | Zbl

[6] Greenberg, Ralph Iwasawa’s theory and $p$ -adic $L$ -functions for imaginary quadratic fields, Number theory related to Fermat’s last theorem (Progress in Math.), Volume 26, Birkhäuser, 1982, pp. 275-285 | DOI | Zbl

[7] Greenberg, Ralph Iwasawa theory and $p$ -adic deformations of motives, Motives (Seattle, WA, 1991) (Proceedings of Symposia in Pure Mathematics), Volume 55, American Mathematical Society (1994), pp. 193-223 | MR | Zbl

[8] Greenberg, Ralph On the structure of certain Galois cohomology groups, Doc. Math. (2006), pp. 335-391 | MR | Zbl

[9] Greenberg, Ralph Surjectivity of the global-to-local map defining a Selmer group, Kyoto J. Math., Volume 50 (2010) no. 4, pp. 853-888 | MR | DOI | Zbl

[10] Greenberg, Ralph On the structure of Selmer groups, Elliptic curves, modular forms and Iwasawa theory (Springer Proc. Math. Stat.), Volume 188, Springer, 2016, pp. 225-252 | MR | DOI | Zbl

[11] Greenberg, Ralph; Vatsal, Vinayak On the Iwasawa invariants of elliptic curves, Invent. Math., Volume 142 (2000) no. 1, pp. 17-63 | MR | DOI | Zbl

[12] Hara, Takashi; Ochiai, Tadashi The cyclotomic Iwasawa main conjecture for Hilbert cuspforms with complex multiplication, Kyoto J. Math., Volume 58 (2018) no. 1, pp. 1-100 | MR | DOI | Zbl

[13] Hida, Haruzo A $p$ -adic measure attached to the zeta functions associated with two elliptic modular forms. I, Invent. Math., Volume 79 (1985) no. 1, pp. 159-195 | MR | DOI | Zbl

[14] Hida, Haruzo Galois representations into ${GL}_{2} (Z_{p} [[X]])$ attached to ordinary cusp forms, Invent. Math., Volume 85 (1986) no. 3, pp. 545-613 | MR | DOI | Zbl

[15] Hida, Haruzo Iwasawa modules attached to congruences of cusp forms, Ann. Sci. Éc. Norm. Supér., Volume 19 (1986) no. 2, pp. 231-273 | MR | DOI | Zbl

[16] Hida, Haruzo A $p$ -adic measure attached to the zeta functions associated with two elliptic modular forms. II, Ann. Inst. Fourier, Volume 38 (1988) no. 3, pp. 1-83 | MR | DOI | Zbl

[17] Hida, Haruzo Elementary theory of $L$ -functions and Eisenstein series, London Mathematical Society Student Texts, 26, Cambridge University Press, 1993, xii+386 pages | MR | DOI | Zbl

[18] Hida, Haruzo On the search of genuine $p$ -adic modular $L$ -functions for $GL (n)$ , Mém. Soc. Math. Fr., Nouv. Sér. (1996) no. 67, pp. 1-110 With a correction to: “On $p$ -adic $L$ -functions of $G L (2) \times G L (2)$ over totally real fields”, Ann. Inst. Fourier 41 (1991), no. 2, p. 311–391 | MR | Zbl

[19] Hida, Haruzo Global quadratic units and Hecke algebras, Doc. Math., Volume 3 (1998), pp. 273-284 | MR | Zbl

[20] Hida, Haruzo Modular forms and Galois cohomology, Cambridge Studies in Advanced Mathematics, 69, Cambridge University Press, 2000, x+343 pages | MR | DOI | Zbl

[21] Hida, Haruzo; Tilouine, Jacques On the anticyclotomic main conjecture for CM fields, Invent. Math., Volume 117 (1994) no. 1, pp. 89-147 | MR | DOI | Zbl

[22] Hsieh, Ming-Lun Eisenstein congruence on unitary groups and Iwasawa main conjectures for CM fields, J. Am. Math. Soc., Volume 27 (2014) no. 3, pp. 753-862 | MR | DOI | Zbl

[23] Kings, Guido; Loeffler, David; Zerbes, Sarah Livia Rankin-Eisenstein classes and explicit reciprocity laws, Camb. J. Math., Volume 5 (2017) no. 1, pp. 1-122 | MR | DOI | Zbl

[24] Lei, Antonio; Loeffler, David; Zerbes, Sarah Livia Euler systems for Rankin-Selberg convolutions of modular forms, Ann. Math., Volume 180 (2014) no. 2, pp. 653-771 | MR | DOI | Zbl

[25] Liu, Qing Algebraic geometry and arithmetic curves, Oxford Graduate Texts in Mathematics, 6, Oxford University Press, 2002, xvi+576 pages (Translated from the French by Reinie Erné) | MR | Zbl

[26] van Order, Jeanine Rankin-Selberg $L$ -functions in cyclotomic towers, I (2012) (https://arxiv.org/abs/1207.1672)

[27] van Order, Jeanine Rankin-Selberg $L$ -functions in cyclotomic towers, II (2012) (https://arxiv.org/abs/1207.1673)

[28] Palvannan, Bharathwaj On Selmer groups and factoring $p$ -adic $L$ -functions, Int. Math. Res. Not. (2017) (published online, to appear in print.) | DOI

[29] The Sage Developers SageMath, the Sage Mathematics Software System (Version 7.2) (http://www.sagemath.org)

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