The Picard Group of Vertex Affinoids in the First Drinfeld Covering
Abstract
Let F be a finite extension of Qp. Let be the Drinfeld upper half plane, and 1 the first Drinfeld covering of . We study the affinoid open subset 1v of 1 above a vertex of the Bruhat-Tits tree for GL2(F). Our main result is that Pic(1v)[p] = 0, which we establish by showing that Pic(Y)[p] = 0 for Y the Deligne-Lusztig variety of SL2(Fq). One formal consequence is a description of the representation H1\'et(1v, Zp(1)) of GL2(OF) as the p-adic completion of O(1v)×.
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