On the locus of 2-dimensional crystalline representations with a given reduction modulo p
Abstract
We consider the family of irreducible crystalline representations of dimension 2 of Gal( Qp/ Qp) given by the Vk,ap for a fixed weight integer k≥ 2. We study the locus of the parameter ap where these representations have a given reduction modulo p. We give qualitative results on this locus and show that for a fixed p and k it can be computed by determining the reduction modulo p of Vk,ap for a finite number of values of the parameter ap. We also generalize these results to other Galois types.
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