Arc-descent for the perfect loop functor and p-adic Deligne--Lusztig spaces

Abstract

We prove that the perfect loop functor LX of a quasi-projective scheme X over a local non-archimedean field k satisfies arc-descent, strengthening a result of Drinfeld. Then we prove that for an unramified reductive group G, the map LG → L(G/B) is a v-surjection. This gives a mixed characteristic version (for v-topology) of an equal characteristic result (in \'etale topology) of Bouthier--Cesnavicius. In the second part of the article, we use the above results to introduce a well-behaved notion of Deligne--Lusztig spaces Xw(b) attached to unramified p-adic reductive groups. We show that in various cases these sheaves are ind-representable, thus partially solving a question of Boyarchenko. Finally, we show that the natural covering spaces X w(b) are pro-\'etale torsors over clopen subsets of Xw(b), and analyze some examples.