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Mod $\ell$ representations of arithmetic fundamental groups II: A conjecture of A. J. de Jong

Published online by Cambridge University Press:  13 March 2006

Gebhard Böckle
Affiliation:
Institut für experimentelle Mathematik, Universität Duisburg-Essen, Standort Essen, Ellernstrasse 29, 45326 Essen, Germanyboeckle@iem.uni-due.de
Chandrashekhar Khare
Affiliation:
Department of Mathematics, University of Utah, 155 S 1400 E, Salt Lake City, UT 84112, USAshekhar@math.utah.edu, shekhar@math.tifr.res.in School of Mathematics, TIFR, Homi Bhabha Road, Mumbai 400 005, India
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Abstract

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We study deformation rings of an n-dimensional representation $\overline{\rho}$, defined over a finite field of characteristic $\ell$, of the arithmetic fundamental group $\pi_1(X)$, where X is a geometrically irreducible, smooth curve over a finite field k of characteristic p ($ \neq \ell$). When $\overline{\rho}$ has large image, we are able to show that the resulting rings are finite flat over $\mathbf{Z}_\ell$. The proof principally uses a Galois-theoretic lifting result of the authors in Part I of this two-part work, a lifting result for cuspidal mod $\ell$ forms of Ogilvie, Taylor–Wiles systems and the result of Lafforgue. This implies a conjecture of de Jong for representations of $\pi_1(X)$ with coefficients in power series rings over finite fields of characteristic $\ell$, that have this mod $\ell$ representation $\overline{\rho}$ as their reduction. A proof of all cases of the conjecture for $\ell>2$ follows from a result announced by Gaitsgory. The methods are different.

Type
Research Article
Copyright
Foundation Compositio Mathematica 2006