Finitely generated profinitely dense free groups in higher rank semi-simple groups

G. A. Soifer; T. N. Venkataramana

doi:10.1007/bf01237181

Finitely generated profinitely dense free groups in higher rank semi-simple groups

G. A. Soifer
, T. N. Venkataramana

Department of Mathematics

Tata Institute of Fundamental Research

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

6 Scopus citations

Abstract

We prove that if Γ is an arithmetic subgroup of a non-compact linear semi-simple group G such that the associated simply connected algebraic group over ℚ has the so-called congruence subgroup property, then Γ contains a finitely generated profinitely dense free subgroup. As a corollary we obtain a f·g·p·d·f subgroup of SL_n(ℤ) (n ≧ 3). More generally, we prove that if Γ is an irreducible arithmetic non-cocompact lattice in a higher rank group, then Γ contains f·g·p·d·f groups.

Original language	English
Pages (from-to)	93-100
Number of pages	8
Journal	Transformation Groups
Volume	5
Issue number	1
DOIs	https://doi.org/10.1007/bf01237181
State	Published - 2000

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abstract = "We prove that if Γ is an arithmetic subgroup of a non-compact linear semi-simple group G such that the associated simply connected algebraic group over ℚ has the so-called congruence subgroup property, then Γ contains a finitely generated profinitely dense free subgroup. As a corollary we obtain a f·g·p·d·f subgroup of SLn(ℤ) (n ≧ 3). More generally, we prove that if Γ is an irreducible arithmetic non-cocompact lattice in a higher rank group, then Γ contains f·g·p·d·f groups.",

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N2 - We prove that if Γ is an arithmetic subgroup of a non-compact linear semi-simple group G such that the associated simply connected algebraic group over ℚ has the so-called congruence subgroup property, then Γ contains a finitely generated profinitely dense free subgroup. As a corollary we obtain a f·g·p·d·f subgroup of SLn(ℤ) (n ≧ 3). More generally, we prove that if Γ is an irreducible arithmetic non-cocompact lattice in a higher rank group, then Γ contains f·g·p·d·f groups.

AB - We prove that if Γ is an arithmetic subgroup of a non-compact linear semi-simple group G such that the associated simply connected algebraic group over ℚ has the so-called congruence subgroup property, then Γ contains a finitely generated profinitely dense free subgroup. As a corollary we obtain a f·g·p·d·f subgroup of SLn(ℤ) (n ≧ 3). More generally, we prove that if Γ is an irreducible arithmetic non-cocompact lattice in a higher rank group, then Γ contains f·g·p·d·f groups.

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Finitely generated profinitely dense free groups in higher rank semi-simple groups

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