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121 results in 11Sxx

Page 7 of 7

  • Facteurs epsilon p-adiques

  • Part of
  • Adriano Marmora
  • Journal:
    Compositio Mathematica / Volume 144 / Issue 2 / March 2008
    Published online by Cambridge University Press:
    01 March 2008, pp. 439-483
    Print publication:
    March 2008
    • Article
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  • We develop and study the epsilon factor of a ‘local system’ of p-adic coefficients over the spectrum of a complete discrete valuation field K with finite residue field of characteristic p>0. In the equal characteristic case, we define the epsilon factor of an overconvergent F-isocrystal over Spec(K), using the p-adic monodromy theorem. We conjecture a global formula, the p-adic product formula, analogous to Deligne’s formula for étale -adic sheaves proved by Laumon, which explains the importance of this local invariant. Namely, for an overconvergent F-isocrystal over an open subset of a projective smooth curve X, the constant of the functional equation of the L-series is expressed as a product of the local epsilon factors at the points of X. We prove the conjecture for rank-one overconvergent F-isocrystals and for finite unit-root overconvergent F-isocrystals. In the mixed characteristic case, we study the behavior of the epsilon factor by deformation to the field of norms.

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