On the semi-infinite Deligne--Lusztig varieties for GSp

Abstract

We prove that Lusztig's semi-infinite Deligne--Lusztig variety for GSp (and its inner form) is isomorphic, as a set with action, to an affine Deligne--Lusztig variety at infinite level, generalizing a result of Chan--Ivanov. Furthermore, we show that a component of some affine Deligne--Lusztig variety X0wr(b)L for GSp can be written, up to perfection, as a direct product of a classical Deligne--Lusztig variety with an affine space. We also study the varieties Xh defined by Chan and Ivanov, and show that Xh at infinite level can be realized as a subset of semi-infinite Deligne--Lusztig varieties defined using components of affine Deligne--Lusztig varieties such as X0wr(b)L above, even in the GSp case. This reinterprets previous constructions of representations from Xh as instances of Lusztig's conjectural picture.