On the non-amenability of the reflective quotient

Chen Meiri

doi:10.1007/s11856-017-1501-3

On the non-amenability of the reflective quotient

Chen Meiri

Mathematics

Technion - Israel Institute of Technology

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

Abstract

Let O(f, ℤ) be the integral orthogonal group of an integral quadratic form f of signature (n, 1). Let R(f, ℤ) be the subgroup of O(f, ℤ) generated by all hyperbolic reflections. Vinberg [Vi3] proved that if n ≥ 30 then the reflective quotient O(f, ℤ)/R(f, ℤ) is infinite. In this note we generalize Vinberg’s theorem and prove that if n ≥ 92 then O(f, ℤ)/R(f, ℤ) contains a non-abelian free group (and thus it is not amenable).

Original language	English
Pages (from-to)	903-916
Number of pages	14
Journal	Israel Journal of Mathematics
Volume	219
Issue number	2
DOIs	https://doi.org/10.1007/s11856-017-1501-3
State	Published - 1 Apr 2017

All Science Journal Classification (ASJC) codes

General Mathematics

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10.1007/s11856-017-1501-3

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abstract = "Let O(f, ℤ) be the integral orthogonal group of an integral quadratic form f of signature (n, 1). Let R(f, ℤ) be the subgroup of O(f, ℤ) generated by all hyperbolic reflections. Vinberg [Vi3] proved that if n ≥ 30 then the reflective quotient O(f, ℤ)/R(f, ℤ) is infinite. In this note we generalize Vinberg{\textquoteright}s theorem and prove that if n ≥ 92 then O(f, ℤ)/R(f, ℤ) contains a non-abelian free group (and thus it is not amenable).",

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AB - Let O(f, ℤ) be the integral orthogonal group of an integral quadratic form f of signature (n, 1). Let R(f, ℤ) be the subgroup of O(f, ℤ) generated by all hyperbolic reflections. Vinberg [Vi3] proved that if n ≥ 30 then the reflective quotient O(f, ℤ)/R(f, ℤ) is infinite. In this note we generalize Vinberg’s theorem and prove that if n ≥ 92 then O(f, ℤ)/R(f, ℤ) contains a non-abelian free group (and thus it is not amenable).

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JO - Israel Journal of Mathematics

JF - Israel Journal of Mathematics

IS - 2

ER -

On the non-amenability of the reflective quotient

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