Classification of normal subgroups of Hecke group H6 in terms of parabolic class number
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Date
2011
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Journal ISSN
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Publisher
AIP
Abstract
In [3], Greenberg showed that n <= 6t(3) so that mu - nt <= 6t(4) for a normal subgroup N of level n and index mu having t parabolic classes in the modular group Gamma. Accola, [1], improved these to n <= 6t(2) always and n <= t(2) if Gamma/N is not abelian. Newman, [5], obtained another generalisation of these results. Hecke groups are generalisations of the modular group. We particularly deal with one of the most important cases, q = 6.
Description
Bu çalışma, 19-25 Eylül 2011 tarihlerinde Halkidiki[Yunanistan]'de düzenlenen International Conference on Numerical Analysis and Applied Mathematics (ICNAAM)'da bildiri olarak sunulmuştur.
Keywords
Mathematics, Hecke groups, Level, Parabolic class number, Riemann surface, Automorphisms
Citation
Yurttaş, A. vd. (2011). "Classification of normal subgroups of Hecke group H6 in terms of parabolic class number". ed. T. E. Simos. AIP Conference Proceedings, Numerical Analysis and Applied Mathematics ICNAAM 2011: International Conference on Numerical Analysis and Applied Mathematics, Vols A-C, 1389, 315-316.