Local deformation rings and a Breuil-M\'ezard conjecture when l≠ p
Abstract
We compute the deformation rings of two dimensional mod l representations of Gal(Fbar/F) with fixed inertial type, for l an odd prime, p a prime distinct from p and F/Qp a finite extension. We show that in this setting (when p is also odd) an analogue of the Breuil-M\'ezard conjecture holds, relating the special fibres of these deformation rings to the mod l reduction of certain irreducible representations of GL2(OF).
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