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CONVEX STANDARD FUNDAMENTAL DOMAIN FOR SUBGROUPS OF HECKE GROUPS
Published online by Cambridge University Press: 14 September 2010
Abstract
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It is well known that if a convex hyperbolic polygon is constructed as a fundamental domain for a subgroup of SL(2,ℝ), then its translates by the group form a locally finite tessellation and its side-pairing transformations form a system of generators for the group. Such a hyperbolically convex fundamental domain for any discrete subgroup can be obtained by using Dirichlet’s and Ford’s polygon constructions. However, these two results are not well adapted for the actual construction of a hyperbolically convex fundamental domain due to their nature of construction. A third, and most important and practical, method of obtaining a fundamental domain is through the use of a right coset decomposition as described below. If Γ2 is a subgroup of Γ1 such that Γ1=Γ2⋅{L1,L2,…,Lm} and 𝔽 is the closure of a fundamental domain of the bigger group Γ1, then the set 
is a fundamental domain of Γ2. One can ask at this juncture, is it possible to choose the right coset suitably so that the set ℛ is a convex hyperbolic polygon? We will answer this question affirmatively for Hecke modular groups.
- Type
- Research Article
- Information
- Bulletin of the Australian Mathematical Society , Volume 83 , Issue 1 , February 2011 , pp. 96 - 107
- Copyright
- Copyright © Australian Mathematical Publishing Association Inc. 2010
References
[1]Beardon, A. L., The Geometry of Discrete Groups, Graduate Texts in Mathematics, 91 (Springer, New York, 1983).CrossRefGoogle Scholar
[2]Cangül, I. N., ‘The group structure of Hecke groups H(λq)’, Turkish J. Math. 20(2) (1996), 203–207.Google Scholar
[3]Cangül, I. N., ‘About some normal subgroups of Hecke groups’, Turkish J. Math. 21 (1997), 143–151.Google Scholar
[4]Evans, R. J., ‘A fundamental region for Hecke’s modular groups’, J. Number Theory 5 (1973), 108–115.CrossRefGoogle Scholar
[6]Hecke, E., ‘Über die Bestimmung Dirichletscher Reichen durch ihre Funktionalgleichungen’, Math. Ann. 112 (1936), 664–699.CrossRefGoogle Scholar
[7]Huang, S., ‘Generalized Hecke groups and Hecke polygons’, Ann. Acad. Sci. Fenn. Math. 24 (1999), 187–214.Google Scholar
[8]Keskin, R., ‘On the parabolic class numbers of some subgroups of Hecke groups’, Turkish J. Math. 22 (1998), 199–205.Google Scholar
[9]Knopp, M. I., Modular Functions in Analytic Number Theory (American Mathematical Society, Providence, RI, 1993).Google Scholar
[10]Kulkarni, R. S., ‘An arithmetic geometric method in the study of the subgroups of the modular group’, Amer. J. Math. 113 (1991), 1053–1133.CrossRefGoogle Scholar
[11]Lang, M. L., ‘Independent generators for congruence subgroups of Hecke groups’, Math. Z. 200(4) (1995), 569–594.CrossRefGoogle Scholar
[12]Lang, M. L., ‘The signatures of the congruence subgroups G 0(τ) of the Hecke groups G 4 and G 6’, Comm. Algebra 28(8) (2000), 3691–3702.CrossRefGoogle Scholar
[13]Lehner, J., Discontinuous Groups and Automorphic Functions (American Mathematical Society, Providence, RI, 1964).CrossRefGoogle Scholar
[14]Leutbecher, A., ‘Über die Heckeschen Gruppen G(λ)’, Abh. Math. Sem. Hamburg 31 (1967), 199–205.CrossRefGoogle Scholar
[15]Leutbecher, A., ‘Über die Heckeschen Gruppen G(λ), II’, Math. Ann. 211 (1974), 63–68.CrossRefGoogle Scholar
[16]Newman, M., ‘Free subgroups and normal subgroups of the modular group’, Illinois J. Math. 8 (1964), 262–265.CrossRefGoogle Scholar
[17]Newman, M., ‘A complete description of the normal subgroups of genus one of the modular group’, Amer. J. Math. 86 (1964), 17–24.CrossRefGoogle Scholar
[18]Newman, M., ‘Normal subgroups of the modular group which are not congruence subgroups’, Proc. Amer. Math. Soc. 16 (1965), 831–832.CrossRefGoogle Scholar
[19]Parson, L. A., ‘Generalized Kloosterman sums and the Fourier coefficients of cusp forms’, Trans. Amer. Math. Soc. 217 (1976), 329–350.CrossRefGoogle Scholar
[20]Parson, L. A., ‘Normal congruence subgroups of the Hecke groups 
and ’, Pacific J. Math. 70 (1977), 481–487.CrossRefGoogle Scholar
and 
’, Pacific J. Math. 70 (1977), 481–487.CrossRefGoogle Scholar[21]Rademacher, H., ‘Über die Erzeugenden der Kongruenzuntergruppen der Modulgruppe’, Abh. Math. Sem. Hamburg 7 (1929), 134–148.CrossRefGoogle Scholar
[22]Rankin, R. A., The Modular Group and its Subgroups (Ramanujan Institute, Madras, 1969).Google Scholar
[23]Schoeneberg, B., Elliptic Modular Functions, Die Grundlehren der mathematische Wissenschaften in Einzeldarstellungen, Band 203 (Springer, Berlin, 1974).CrossRefGoogle Scholar
[24]Tietz, H., ‘Über Konvexheit im kleinen und im großen und über gewissen den Punkten einer Menge zugeordnete Dimensionszahlen’, Math. Z. 28 (1928), 697–707.CrossRefGoogle Scholar
[25]Yayenie, O., ‘Subgroups of some Fuchsian groups defined by two linear congruences’, Conform. Geom. Dyn. 11 (2007), 271–287.CrossRefGoogle Scholar
[26]Yayenie, O., ‘Nonexistence of cuspidal fundamental domain’, Bull. Korean Math. Soc. 46(5) (2009), 823–833.CrossRefGoogle Scholar
[27]Young, J., ‘On the group of sign (0,3;2,4,∞) and the functions belonging to it’, Trans. Amer. Math. Soc. 5 (1904), 81–104.Google Scholar
[28]Zagier, D., ‘Modular parametrization of elliptic curves’, Canad. Math. Bull. 28 (1985), 372–384.CrossRefGoogle Scholar
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