Crystalline liftability of irregular weights
Abstract
Let p be an odd prime. Let K/Qp be a finite unramified extension. Let : GK GL2(Fp) be a continuous representation. We prove that has a crystalline lift of small irregular weight if and only if it has multiple crystalline lifts of certain specified regular weights. The inspiration for this result comes from work of Diamond-Sasaki on geometric Serre weight conjectures. Our result provides a way to translate results currently formulated only for regular weights to also include irregular weights. The proof uses results on Kisin and (,G)-modules obtained from extending recent work of Gee-Liu-Savitt to study crystalline liftability of irregular weights.
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