Counting non-uniform lattices

被引：1

作者：

Belolipetsky, Mikhail ^{[1
]}

Lubotzky, Alexander ^{[2
]}

机构：

[1] Inst Nacl Matemat Pura & Aplicada, Estr Dona Castorina 100, BR-22460320 Rio De Janeiro, Brazil

[2] Hebrew Univ Jerusalem, Inst Math, IL-91904 Jerusalem, Israel

来源：

ISRAEL JOURNAL OF MATHEMATICS | 2019年 / 232卷 / 01期

基金：

欧洲研究理事会;

关键词：

ALGEBRAIC-GROUPS; SUBGROUP GROWTH; NUMBER; EXISTENCE;

D O I：

10.1007/s11856-019-1868-4

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

In [BGLM] and [GLNP] it was conjectured that if H is a simple Lie group of real rank at least 2, then the number of conjugacy classes of (arithmetic) lattices in H of covolume at most x is x((gamma(H)+o(1)) log x/ log log x) where gamma(H) is an explicit constant computable from the (absolute) root system of H. In [BLu] we disproved this conjecture. In this paper we prove that for most groups H the conjecture is actually true if we restrict to counting only non-uniform lattices.

引用

页码：201 / 229

页数：29

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