First covering of Drinfel'd upper half plane and Banach representations of GL2(Qp)
Abstract
We construct some admissible Banach representations of GL2(Qp) that conjecturally should correspond to some 2-dimensional tamely ramified, potentially Barsotti-Tate representations of GQp via the p-adic local Langlands correspondence. To achieve this, we generalize Breuil's work in the semi-stable case and work on the first covering of Drinfel'd upper half plane. Our main tool is an explicit semi-stable model of the first covering.
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