On the remainder term of the Weyl law for congruence subgroups of Chevalley groups

Abstract

Let X be a locally symmetric space defined by a simple Chevalley group G and a congruence subgroup of G( Q). In this generality, the Weyl law for X was proved by Lindenstrauss--Venkatesh. In the case where G is simply connected, we sharpen their result by giving a power saving estimate for the remainder term.