Serre weight conjectures for \(p\)-adic unitary groups of rank 2
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Publication:2112370
DOI10.2140/ant.2022.16.2005OpenAlexW2896483500MaRDI QIDQ2112370
Publication date: 10 January 2023
Published in: Algebra \& Number Theory (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1810.03827
Other groups and their modular and automorphic forms (several variables) (11F55) Congruences for modular and (p)-adic modular forms (11F33) Galois representations (11F80) Representations of finite groups of Lie type (20C33)
Cites Work
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- Patching and the \(p\)-adic local Langlands correspondence
- Weight cycling and Serre-type conjectures for unitary groups
- Monodromy and local-global compatibility for \(l=p\)
- A classification of the irreducible mod-\(p\) representations of \(U(1,1)(\mathbb{Q}_{p^2}/\mathbb{Q}_p)\)
- A family of Calabi-Yau varieties and potential automorphy. II.
- On the weights of mod \(p\) Hilbert modular forms
- On Serre's conjecture for mod \(\ell \) Galois representations over totally real fields
- Local-global compatibility and the action of monodromy on nearby cycles
- Moduli of finite flat group schemes, and modularity
- Explicit base change lifts of the supercuspidal representations of \(U(1,1)(F_0)\)
- Automorphy for some \(l\)-adic lifts of automorphic mod \(l\) Galois representations. With Appendix A, summarizing unpublished work of Russ Mann, and Appendix B by Marie-France Vignéras.
- Automorphy for some \(l\)-adic lifts of automorphic mod \(l\) Galois representations. II
- Zur Reduktion modulo p der Charaktere von Deligne und Lusztig
- Representations of reductive groups over finite fields
- On the irreducible characters of the finite unitary groups
- Modular multiplicities and representations of \(\text{GL}_2(\mathbb Z_p)\) and \(\text{Gal}(\overline{\mathbb Q}_p/\mathbb Q_p)\) at \(\ell=p\)
- General Serre weight conjectures
- \(G\)-valued local deformation rings and global lifts
- Potentially crystalline deformation rings and Serre weight conjectures: shapes and shadows
- The weight in a Serre-type conjecture for tame \(n\)-dimensional Galois representations
- Central morphisms and cuspidal automorphic representations
- Multiplicity one for wildly ramified representations
- Weight elimination in Serre-type conjectures
- Lattices in the cohomology of Shimura curves
- Ordinary representations of \(G(\mathbb{Q}_p)\) and fundamental algebraic representations
- On the meromorphic continuation of degree two \(L\)-functions
- Serre weights for rank two unitary groups
- Potential automorphy and change of weight
- On a problem of local-global compatibility modulo \(p\) for \(\mathrm{GL}_2\) (with an Appendix of Lassina Dembélé)
- The \(p\)-adic local Langlands correspondence for \(\mathrm{GL}_2(\mathbb{Q}_p)\)
- Depth-zero base change for unramified \(U(2,1)\)
- The Geometry and Cohomology of Some Simple Shimura Varieties. (AM-151)
- The conjectural connections between automorphic representations and Galois representations
- Towards a modulo 𝑝 Langlands correspondence for 𝐺𝐿₂
- La correspondance de Langlands locale p-adique pour GL_2(Q_p)
- The sign of Galois representations attached to automorphic forms for unitary groups
- On the automorphy of l-adic Galois representations with small residual image With an appendix by Robert Guralnick, Florian Herzig, Richard Taylor and Jack Thorne
- L-Indistinguishability For SL (2)
- Automorphic Representation of Unitary Groups in Three Variables. (AM-123)
- Un calcul d’anneaux de déformations potentiellement Barsotti–Tate
- On mod local-global compatibility for in the ordinary case
- Kisin modules with descent data and parahoric local models
- MULTIPLICITY ONE AT FULL CONGRUENCE LEVEL
- Modularity lifting theorems for Galois representations of unitary type
- SERRE WEIGHTS AND BREUIL’S LATTICE CONJECTURE IN DIMENSION THREE
- The Buzzard–Diamond–Jarvis conjecture for unitary groups
- Crystalline representations and F-crystals
- Potentially semi-stable deformation rings
- THE BREUIL–MÉZARD CONJECTURE FOR POTENTIALLY BARSOTTI–TATE REPRESENTATIONS
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