A note on reductions of 2-dimensional crystalline Galois representations
Abstract
Let p be an odd prime number, Kf the finite unramified extension of Qp of degree f, and GKf its absolute Galois group. We construct analytic families of \'etale (,)-modules which give rise to some families of 2-dimensional crystalline representations of GKf with length of filtration ≥ p. As an application, we prove that the modulo p reductions of the members of each such family (with respect to appropriately chosen Galois-stable lattices) are constant.
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