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Your search keyword '"Böckle, Gebhard"' showing total 7 results
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7 results on '"Böckle, Gebhard"'

1. Wiles defect of Hecke algebras via local-global arguments

Author

Boeckle, Gebhard, Khare, Chandrashekhar B., and Manning, Jeffrey

Subjects
Mathematics - Number Theory, 11F80
Abstract

We continue our study of the Wiles defect of deformation rings $R$ and Hecke rings $T$ (at a newform $f$) acting on the cohomology of Shimura curves. The Wiles defect at an augmentation $\lambda_f:T \to O$ measures the failure of $R,T$ to be complete intersections locally at $\lambda_f$. In situations we study here the Taylor-Wiles-Kisin patching method gives an isomorphism $R=T$ without the rings being complete intersections. Using novel arguments in commutative algebra and patching, we generalize significantly and give different proofs of our earlier results that compute the Wiles defect at $\lambda_f: R=T \to O$, and explain in an a priori manner why the answer is a sum of local defects. As a curious application of our work we give a new and more robust approach to the result of Ribet--Takahashi that computes change of degrees of optimal parametrizations of elliptic curves by Shimura curves as we vary the Shimura curve., Comment: with an appendix by Najmuddin Fakhruddin and Chandrashekhar Khare

Published
2021

2. Wiles defect for Hecke algebras that are not complete intersections

Author

Boeckle, Gebhard, Khare, Chandrashekhar, and Manning, Jeffrey

Subjects
Mathematics - Number Theory, 11F80
Abstract

In his work on modularity theorems, Wiles proved a numerical criterion for a map of rings $R\to T$ to be an isomorphism of complete intersections. He used this to show that certain deformation rings and Hecke algebras associated to a mod $p$ Galois representation at non-minimal level were isomorphic and complete intersections, provided the same was true at minimal level. In this paper we study Hecke algebras acting on cohomology of Shimura curves arising from maximal orders in indefinite quaternion algebras over the rationals localized at a semistable irreducible mod $p$ Galois representation $\overline \rho$. If $\overline \rho$ is scalar at some primes dividing the discriminant of the quaternion algebra, then Hecke algebra is still isomorphic to the deformation ring, but is not a complete intersection, or even Gorenstein, so the Wiles numerical criterion cannot apply. We consider a weight 2 newform $f$ which contributes to the cohomology of the Shimura curve and gives rise to an augmentation $\lambda_f$ of the Hecke algebra. We quantify the failure of the Wiles numerical criterion at $\lambda_f$ by computing the associated {\it Wiles defect} purely in terms of the local behavior at primes dividing the discriminant of the global Galois representation $\rho_f$ which $f$ gives rise to by the Eichler--Shimura construction. One of the main tools used in the proof is Taylor--Wiles--Kisin patching., Comment: revision after comments of referees, to appear in Compositio Mathematica

Published
2019

3. On the semisimplicity of reductions and adelic openness for $E$-rational compatible systems over global function fields

Author

Böckle, Gebhard, Gajda, Wojciech, and Petersen, Sebastian

Subjects
Mathematics - Algebraic Geometry, 11F80
Abstract

Let $X$ be a normal geometrically connected variety over a finite field $\kappa$ of characteristic~$p$. Let $E$ be a number field. Using automorphic methods over global function fields, we derive properties of the geometric monodromy groups of arbitrary connected $E$-rational semisimple compatible systems $(\rho_\lambda)$ of $n$-dimensional representations of the arithmetic fundamental group $\pi_1(X)$, where $\lambda$ ranges over the finite places of $E$ not above $p$: Let $\Lambda_\lambda$ be any $\pi_1(X)$-stable lattice in $E_\lambda^n$ under $\rho_\lambda$. Then for almost all $\lambda$, the schematic closure of the geometric monodromy $\rho_\lambda(\pi_1(X_{\overline{\kappa}}))$ in $\mathrm{Aut}_{\mathcal{O}_\lambda}(\Lambda_\lambda)$ is a semisimple $\mathcal{O}_\lambda$-group scheme, and its special fiber agrees with the Nori envelope of the geometric monodromy of the mod-$\lambda$ reduction of $\rho_\lambda$. A comparable result under different hypotheses was recently proved by Cadoret, Hui and Tamagawa by other methods. We also provide natural criteria for the image of $\pi_1(X_{\overline{\kappa}})$ under $\prod_\lambda\rho_\lambda$ to have adelic open image in an appropriate sense., Comment: Accepted for publication in Transactions of the American Mathematical Society, 66 pages

Published
2019

5. Lifting <f>mod p</f> representations to characteristics <f>p2</f>

Author

Böckle, Gebhard

Subjects
*GALOIS modules (Algebra), *ALGEBRAIC geometry
Abstract

There is an abundance of Galois representations in characteristic p that arise as the mod p reduction of a characteristic zero representation from algebraic geometry. Except for two-dimensional representations there is little known about the set of mod p representations that should arise this way. As a first step in this direction, we consider the problem of finding lifts to characteristic p2 for a representation ρ¯ : GK≔Gal(Ksep/K)→GLn(κ), where κ is a finite field of characteristic p, K a local or global field and n any positive integer.If K is a local field, we can show that such lifts always exist. However if p|n, one cannot always fix the determinant of a lift. We also present some partial results for the existence of lifts to characteristic zero.For global fields K, we can construct lifts only if, vaguely speaking, ‘the prime-to-p image of ρ¯ is large inside GLn(κ)’. A sufficient condition for this is the vanishing of H1(Im(ρ¯′),Mn(κ)), where ρ¯′ is the restriction of ρ¯ to GK(ζp) and the action on Mn(κ) is the adjoint action. Based on methods of Cline, Parshall and Scott, we will give a group theoretic criterion for this first cohomology group to vanish. [Copyright &y& Elsevier]

Published
2003
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