Abstract
Let X be a locally symmetric space defined by a simple Chevalley group G and a congruence subgroup of . In this generality, the Weyl law for X was proved by Lindenstrauss and Venkatesh. In the case where G is simply connected, we sharpen their result by giving a power-saving estimate for the remainder term.
Citation
Tobias Finis. Erez Lapid. "On the remainder term of the Weyl law for congruence subgroups of Chevalley groups." Duke Math. J. 170 (4) 653 - 695, 15 March 2021. https://doi.org/10.1215/00127094-2020-0094
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