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THE MINIMUM INDEX OF A NON-CONGRUENCE SUBGROUP OF SL2 OVER AN ARITHMETIC DOMAIN. II: THE RANK ZERO CASES

Published online by Cambridge University Press:  04 February 2005

A. W. MASON  and
ANDREAS SCHWEIZER
A. W. MASON
Affiliation:
Department of Mathematics, University of Glasgow, Glasgow G12 8QW, United Kingdomawm@maths.gla.ac.uk
ANDREAS SCHWEIZER
Affiliation:
Korea Institute for Advanced Study (KIAS), 207–43 Cheongnyangni 2-dong, Dongdaemun-gu, Seoul 130-722, Koreaschweiz@kias.re.kr
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Abstract

Let $K$ be a function field of genus $g$ with a finite constant field ${\mathbb{F}}_q$. Choose a place $\infty$ of $K$ of degree $\delta$ and let ${\mathbb{C}}$ be the arithmetic Dedekind domain consisting of all elements of $K$ that are integral outside $\infty$. An explicit formula is given (in terms of $q$, $g$ and $\delta$) for the minimum index of a non-congruence subgroup in SL$_2({\mathcal{C}})$. It turns out that this index is always equal to the minimum index of an arbitrary proper subgroup in SL$_2({\mathcal{C}})$. The minimum index of a normal non-congruence subgroup is also determined.

Keywords

11F0619B3720H0520E0820G30
Type
Notes and Papers
Information
Journal of the London Mathematical Society , Volume 71 , Issue 1 , February 2005 , pp. 53 - 68
Copyright
The London Mathematical Society 2005

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