p-adic Langlands correspondence and Iwasawa theory
de
mercredi 24 avril 2019 (09:00)
à
vendredi 26 avril 2019 (18:00)
lundi 22 avril 2019
mardi 23 avril 2019
mercredi 24 avril 2019
09:00
Welcome coffee
Welcome coffee
09:00 - 09:45
Room: Salle Kampé de Fériet
09:45
The Serre filtration on mod p Hilbert modular forms of level p
-
Fred Diamond
The Serre filtration on mod p Hilbert modular forms of level p
Fred Diamond
09:45 - 10:45
Room: Salle de réunion
A result of Serre relates the space of mod p modular forms of level Gamma_1(Np) and weight 2 to the spaces of mod p modular forms of level Gamma_1(N) and weight between 2 and p+1. I’ll explain a generalization of this to the context of Hilbert modular forms involving a mod p geometric Jacquet-Langlands correspondence. The resulting filtration on mod p Hilbert modular forms of parallel weight 2 and pro-p Iwahori level mirrors the more evident one in cohomology coming from the mod p representation theory of GL_2. This is joint work with P. Kassaei and S. Sasaki.
11:00
Local-global compatibility and the cohomology of locally symmetric spaces
-
James Newton
Local-global compatibility and the cohomology of locally symmetric spaces
James Newton
11:00 - 12:00
Room: Salle de réunion
I will discuss joint work with Allen, Calegari, Caraiani, Gee, Helm, Le Hung, Scholze, Taylor and Thorne on potential automorphy for certain compatible systems of Galois representations over CM fields. I will particularly focus on the local-global compatibility results needed to establish our automorphy lifting theorems in the ordinary case and explain the application of a key local ingredient: the computation (due to Hauseux) of derived ordinary parts of parabolically induced representations.
12:00
Lunch break
Lunch break
12:00 - 14:00
14:00
An application of a conjecture of Mazur–Tate to supersingular elliptic curves
-
Emmanuel Lecouturier
An application of a conjecture of Mazur–Tate to supersingular elliptic curves
Emmanuel Lecouturier
14:00 - 15:00
Room: Salle de réunion
See the attached document.
15:00
Coffee break
Coffee break
15:00 - 15:30
Room: Salle Kampé de Fériet
15:30
On extra zeros of p-adic L-functions
-
Denis Benois
On extra zeros of p-adic L-functions
Denis Benois
15:30 - 16:30
Room: Salle de réunion
See the attached document.
jeudi 25 avril 2019
09:00
Coffee and pastries
Coffee and pastries
09:00 - 09:45
Room: Salle Kampé de Fériet
09:45
Dilogarithm and higher L invariants for GL3(Qp)
-
Zicheng Qian
Dilogarithm and higher L invariants for GL3(Qp)
Zicheng Qian
09:45 - 10:45
Room: Salle de réunion
We consider a semi-stable three dimensional p-adic representation ρ of the absolute Galois group of Qp and assume that ρ has rank two monodromy and is non-critical. It is known that ρ depends on three L invariants up to isomorphism. We construct an explicit family of locally analytic representations of GL3(Qp) depending on three invariants and show that there exists a unique representation (conjecturally depends only on ρ) in this family that embeds into a suitable given Hecke eigenspace associated with a global Galois representation whose restriction at p is ρ. We will briefly introduce the construction which involves p-adic dilogarithm and then explain the relation between these representations and previous results by Breuil, Ding and Schraen.
11:00
p-adic cohomology of some period domains
-
Gabriel Dospinescu
p-adic cohomology of some period domains
Gabriel Dospinescu
11:00 - 12:00
Room: Salle de réunion
We will explain how to adapt Orlik's computation of the compactly supported l-adic cohomology of many p-adic period domains (l different from p) to the case l=p. The key input is a vanishing theorem for extensions between generalized Steinberg representations of p-adic reductive groups, with coefficients mod p. This is joint work with Pierre Colmez, Julien Hauseux and Wieslawa Niziol.
12:00
Lunch break
Lunch break
12:00 - 14:00
14:00
The eigencurve at Eisenstein weight one points
-
Alice Pozzi
The eigencurve at Eisenstein weight one points
Alice Pozzi
14:00 - 15:00
Room: Salle de réunion
In this talk, we discuss the geometry of the Coleman-Mazur eigencurve at weight one Eisenstein points. The local nature of the eigencurve is mostly understood at classical points of weight greater than one, while one observes some unusual behaviours at weight one. In particular, we study cuspidal Hida families specializing to Eisenstein series at weight one. Our approach consists in studying the deformation rings of certain (deceptively simple!) Artin representations. We discuss the implications of our analysis on the classicality of a certain overconvergent eigenspace. Finally, we explain how this Galois-theoretic method yields some new insight on Gross’s formula relating the leading term of the p-adic L-function to a Stark unit. This is joint work with Adel Betina and Mladen Dimitrov.
15:00
Coffee break
Coffee break
15:00 - 15:30
Room: Salle Kampé de Fériet
15:30
Hilbert modular eigenvariety at exotic and CM classical points of parallel weight one
-
Shaunak Deo
Hilbert modular eigenvariety at exotic and CM classical points of parallel weight one
Shaunak Deo
15:30 - 16:30
Room: Salle de réunion
We sketch our recent results about the geometry of the p-adic eigenvariety constructed by Andreatta-Iovita-Pilloni, which interpolates Hilbert modular eigenforms over a totally real field F, at classical, regular points of parallel weight one which either are CM or have exotic projective image. To prove these results, we assume the p-adic Schanuel conjecture in most of the cases. The key ingredient in our proof is calculation of the dimension of the tangent spaces of some Galois deformation problems. This talk is based on joint work with A. Betina and F. Fite.
16:45
On the Hilbert cuspidal eigenvariety at weight one Eisenstein points
-
Sheng-Chi Shih
On the Hilbert cuspidal eigenvariety at weight one Eisenstein points
Sheng-Chi Shih
16:45 - 17:45
Room: Salle de réunion
When the p-adic L-function of a finite order totally odd character \phi of a totally real field F has trivial zeros, any p-stabilization of the corresponding weight one Eisenstein series belongs to the Hilbert cuspidal eigencurve. In the case of elliptic modular forms, it was proved by Betina-Dimitrov-Pozzi that such points are etale over the weight space, hence belong to a unique cuspidal Hida family. In this talk, we will first present a generalisation to a real quadratic field in which p splits. The complexity of the geometry of the Hilbert cuspidal eigencurve at such points growing with the dimension of H^1(F,\phi) which equals the degree of F, a challenging question is to determine the extension classes occurring in Galois representations attached to cuspidal Hida families. We will provide a partial answer in the case when p is inert in F and satisfied the Leopoldt conjecture. A key step of our work is to construct p-ordinary irreducible Galois representations with values in certain local rings of the eigencurve. As an application, we give a new proof of the rank one abelian Gross-Stark conjecture relating the leading term of p-adic L-function of \phi and a non-zero algebraic L-invariant. This conjecture was first proved by Dasgupta-Darmon-Pollack under the assumption that a sum of two analytic L-invariances is non-zero. This is an ongoing work with Adel Betina and Mladen Dimitrov.
19:00
Conference dinner
Conference dinner
19:00 - 22:00
vendredi 26 avril 2019
09:00
Coffee and pastries
Coffee and pastries
09:00 - 09:30
Room: Salle Kampé de Fériet
09:30
Norm-compatible cohomology classes in Siegel varieties
-
Joaquin Rodrigues Jacinto
Norm-compatible cohomology classes in Siegel varieties
Joaquin Rodrigues Jacinto
09:30 - 10:30
Room: Salle de réunion
We will explain how to construct towers of interesting classes in the cohomology of Siegel sixfolds. We will study their complex regulator and we will give an application to Iwasawa theory. This is joint work with Antonio Cauchi and Francesco Lemma.
10:45
Geometry of Siegel eigenvarieties at Saito–Kurokawa points
-
Adel Betina
Geometry of Siegel eigenvarieties at Saito–Kurokawa points
Adel Betina
10:45 - 11:45
Room: Salle de réunion
I will report on joint work with T. Berger studying the geometry of Siegel eigenvarieties. Under certain assumptions we show that they are smooth at points corresponding to Saito-Kurokawa lifts when the tame level is paramodular, but singular when it is Gamma_0(N). Moreover, we give an application to the Bloch-Kato conjecture. Our technique uses pseudorepresentations of p-adic families of cuspidal Siegel eigenforms and analytic continuation of crystalline periods.
11:45
Lunch break
Lunch break
11:45 - 13:30
13:30
On the geometry of Pappas–Rapoport Shimura varieties
-
Stéphane Bijakowski
On the geometry of Pappas–Rapoport Shimura varieties
Stéphane Bijakowski
13:30 - 14:30
Room: Salle de réunion
After recalling the geometry of the special fiber of the modular curve, I will talk about possible generalizations to Shimura varieties. I will explain why the situation is more involved when ramification appears, and why one is led to use models defined by Pappas and Rapoport. I will then define an analogous of the ordinary locus in this context. This is joint work with V. Hernandez.
14:30
Coffee break
Coffee break
14:30 - 15:00
Room: Salle Kampé de Fériet
15:00
On the density of automorphic points in global deformation spaces
-
Benjamin Schraen
On the density of automorphic points in global deformation spaces
Benjamin Schraen
15:00 - 16:00
Room: Salle de réunion
I will discuss the problem of the repartition of automorphic points in global polarized deformation spaces. We can ask the problem in terms of fixed level and varying weight or fixed weight and varying level. I will describe positive answers to these problems and their link with the problem of companion p-adic overconvergent automorphic forms.