On families of strongly divisible modules of rank 2
Abstract
Let p be an odd prime, and Qpf the unramified extension of Qp of degree f. In this paper, we reduce the problem of constructing strongly divisible modules for 2-dimensional semi-stable non-crystalline representations of Gal(Qp/Qpf) with Hodge--Tate weights in the Fontaine--Laffaille range to solving systems of linear equations and inequalities. We also determine the Breuil modules corresponding to the mod-p reduction of the strongly divisible modules. We expect our method to produce at least one Galois-stable lattice in each such representation for general f. Moreover, when the mod-p reduction is an extension of distinct characters, we further expect our method to provide the two non-homothetic lattices. As applications, we show that our approach recovers previously known results for f=1 and determine the mod-p reduction of the semi-stable representations with some small Hodge--Tate weights when f=2.
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