Bryden Cais
Published 2014-07-22Version 1
We construct the $\Lambda$-adic crystalline and Dieudonn\'e analogues of Hida's ordinary $\Lambda$-adic \'etale cohomology, and employ integral $p$-adic Hodge theory to prove $\Lambda$-adic comparison isomorphisms between these cohomologies and the $\Lambda$-adic de Rham cohomology studied in the prequel to this paper as well as Hida's $\Lambda$-adic \'etale cohomology. As applications of our work, we provide a "cohomological" construction of the family of $(\varphi,\Gamma)$-modules attached to Hida's ordinary $\Lambda$-adic \'etale cohomology by the work of Dee, and we give a new and purely geometric proof of Hida's finitenes and control theorems. We also prove suitable $\Lambda$-adic duality theorems for each of the cohomologies we construct.
Comments: This paper is a continuation of our previous paper "The Geometry of Hida Families I: $\Lambda$-adic de Rham cohomology", and is a revised version of part of the paper arXiv:1209.0046
The Geometry of Hida Families I: $Λ$-adic de Rham cohomology
The Geometry of Hida Families and Λ-adic Hodge Theory
$p$-adic $L$-functions on Hida Families
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