The number of subgroups of given index in the modular group*

W. W. Stothers

doi:10.1017/S0308210500009860

Synopsis

A new formula is obtained for the number of subgroups of given index in the modular group. The formula is used to prove a recent conjecture on the parity of the number of subgroups.

References

1Dey, I. M. S.Schreier systems in free products. Proc. Glasgow Math. Assoc. 7 (1965), 61–79.CrossRef Google Scholar

2Dickson, L. E.History of the theory of numbers, I (New York: Chelsea, 1919).Google Scholar

3Millington, M. H.Subgroups of the classical modular group. J. London Math. Soc. 1 (1970), 351–357.Google Scholar

4Newman, M.Asymptotic formulas related to free products of cyclic groups. Math. Comp, 30 (1976), 838–846.CrossRef Google Scholar

5Stothers, W. W.Subgroups of the modular group. Proc. Cambridge Philos. Soc. 75 (1974), 139–153.CrossRef Google Scholar

6Stothers, W. W. On some discrete triangle groups (Cambridge Univ. Ph.D. Thesis, 1971).Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Imrich, Wilfried 1978. On the number of subgroups of given index inSL 2(Z). Archiv der Mathematik, Vol. 31, Issue. 1, p. 224.

Stothers, W. W. 1978. Free subgroups of the free product of cyclic groups. Mathematics of Computation, Vol. 32, Issue. 144, p. 1274.

Godsil, C. Imrich, W. and Razen, R. 1979. On the number of subgroups of given index in the modular group. Monatshefte für Mathematik, Vol. 87, Issue. 4, p. 273.

Stothers, W. W. 1981. On a result of Petersson concerning the modular group. Proceedings of the Royal Society of Edinburgh: Section A Mathematics, Vol. 87, Issue. 3-4, p. 263.

Stothers, W. W. 1981. Subgroups of infinite index in the modular group II. Glasgow Mathematical Journal, Vol. 22, Issue. 1, p. 101.

Macbeath, A. M. 1987. Superimprimitive 2-generator finite groups. Proceedings of the Edinburgh Mathematical Society, Vol. 30, Issue. 1, p. 103.

Stothers, W. W. 1989. On formulae of Macbeath and Hussein. Glasgow Mathematical Journal, Vol. 31, Issue. 1, p. 65.

Grady, Michael and Newman, Morris 1992. Some divisibility properties of the subgroup counting function for free products. Mathematics of Computation, Vol. 58, Issue. 197, p. 347.

Lubotzky, Alexander 1995. Subgroup growth and congruence subgroups. Inventiones Mathematicae, Vol. 119, Issue. 1, p. 267.

Sury, B. 1998. Arithmetic of subgroup counting in some free products. Linear and Multilinear Algebra, Vol. 44, Issue. 4, p. 347.

Müller, Thomas W. 2003. Modular subgroup arithmetic in free products. Forum Mathematicum, Vol. 15, Issue. 5,

Müller, Thomas W. and Schlage-Puchta, Jan-Christoph 2004. Classification and statistics of finite index subgroups in free products. Advances in Mathematics, Vol. 188, Issue. 1, p. 1.

Cameron, Peter J. and Müller, Thomas W. 2005. A descent principle in modular subgroup arithmetic. Journal of Pure and Applied Algebra, Vol. 203, Issue. 1-3, p. 189.

Anis, S. and Mushtaq, Q. 2008. The Number of Subgroups ofPSL(2,Z) When Acting onFp ∪ {∞}. Communications in Algebra, Vol. 36, Issue. 11, p. 4276.

Krattenthaler, C. and Müller, Thomas W. 2008. Parity patterns associated with lifts of Hecke groups. Abhandlungen aus dem Mathematischen Seminar der Universität Hamburg, Vol. 78, Issue. 1, p. 99.

Article contents

The number of subgroups of given index in the modular group*

Synopsis

Access options

References

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

The number of subgroups of given index in the modular group*

Synopsis

Access options

References

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests