Etale and crystalline companions, II

Abstract

Let X be a smooth scheme over a finite field of characteristic p. In answer to a conjecture of Deligne, we establish that for any prime ≠ p, an -adic Weil sheaf on X which is algebraic (or irreducible with finite determinant) admits a crystalline companion in the category of overconvergent F-isocrystals, for which the Frobenius characteristic polynomials agree at all closed points (with respect to some fixed identification of the algebraic closures of Q within fixed algebraic closures of Q and Qp). The argument depends heavily on the free passage between -adic and p-adic coefficients for curves provided by the Langlands correspondence for GLn over global function fields (work of L. Lafforgue and T. Abe), and on the construction of Drinfeld (plus adaptations by Abe-Esnault and Kedlaya) giving rise to \'etale companions of overconvergent F-isocrystals. As corollaries, we transfer a number of statements from crystalline to \'etale coefficient objects, including properties of the Newton polygon stratification (results of Grothendieck-Katz and de Jong-Oort-Yang) and Wan's theorem (previously Dwork's conjecture) on p-adic meromorphicity of unit-root L-functions.