The congruence topology, Grothendieck duality and thin groups

Alexander Lubotzky; Tyakal Nanjundiah Venkataramana

doi:10.2140/ant.2019.13.1281

The congruence topology, Grothendieck duality and thin groups

Alexander Lubotzky, Tyakal Nanjundiah Venkataramana

Einstein Institute of Mathematics

The Hebrew University of Jerusalem

Research output: Contribution to journal › Article › peer-review

Abstract

This paper answers a question raised by Grothendieck in 1970 on the “Grothendieck closure” of an integral linear group and proves a conjecture of the first author made in 1980. This is done by a detailed study of the congruence topology of arithmetic groups, obtaining along the way, an arithmetic analogue of a classical result of Chevalley for complex algebraic groups. As an application we also deduce a group theoretic characterization of thin subgroups of arithmetic groups.

Original language	English
Pages (from-to)	1281-1298
Number of pages	18
Journal	Algebra and Number Theory
Volume	13
Issue number	6
DOIs	https://doi.org/10.2140/ant.2019.13.1281
State	Published - 2019

Keywords

Congruence subgroup
Thin groups

All Science Journal Classification (ASJC) codes

Algebra and Number Theory

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10.2140/ant.2019.13.1281

Cite this

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abstract = "This paper answers a question raised by Grothendieck in 1970 on the “Grothendieck closure” of an integral linear group and proves a conjecture of the first author made in 1980. This is done by a detailed study of the congruence topology of arithmetic groups, obtaining along the way, an arithmetic analogue of a classical result of Chevalley for complex algebraic groups. As an application we also deduce a group theoretic characterization of thin subgroups of arithmetic groups.",

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AB - This paper answers a question raised by Grothendieck in 1970 on the “Grothendieck closure” of an integral linear group and proves a conjecture of the first author made in 1980. This is done by a detailed study of the congruence topology of arithmetic groups, obtaining along the way, an arithmetic analogue of a classical result of Chevalley for complex algebraic groups. As an application we also deduce a group theoretic characterization of thin subgroups of arithmetic groups.

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M3 - مقالة

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JO - Algebra and Number Theory

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The congruence topology, Grothendieck duality and thin groups

Abstract

Keywords

All Science Journal Classification (ASJC) codes

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