A quotient of the Lubin-Tate tower
Abstract
In this article we show that the quotient of the Lubin-Tate space at infinite level by the Borel subgroup of upper triangular matrices in GL(2,Qp) exists as a perfectoid space. As an application we show that Scholze's functor Hiet(P1,F(pi)) is concentrated in degree one whenever pi is a principal series representation or a twist of the Steinberg representation of GL(2,Qp).
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