Infinitely many hypermaps of a given type and genus
The electronic journal of combinatorics, Tome 17 (2010)
It is conjectured that given positive integers $l$, $m$, $n$ with $l^{-1}+m^{-1}+n^{-1} < 1$ and an integer $g \geq 0$, the triangle group $\Delta=\Delta (l,m,n)=\langle X, Y, Z | X^l=Y^m=Z^n=XYZ=1 \rangle $ contains infinitely many subgroups of finite index and of genus $g$. A slightly stronger version of this conjecture is as follows: given positive integers $l$, $m$, $n$ with $l^{-1}+m^{-1}+n^{-1} < 1$ and an integer $g \geq 0$, there are infinitely many nonisomorphic compact orientable hypermaps of type $(l,m,n)$ and genus $g$. We prove that these conjectures are true when two of the parameters $l$, $m$, $n$ are equal, by showing how to construct appropriate hypermaps.
DOI :
10.37236/420
Classification :
05C10, 05C25, 20E07
Mots-clés : triangle group, nonisomorphic compact orientable hypermaps
Mots-clés : triangle group, nonisomorphic compact orientable hypermaps
@article{10_37236_420,
author = {Gareth A. Jones and Daniel Pinto},
title = {Infinitely many hypermaps of a given type and genus},
journal = {The electronic journal of combinatorics},
year = {2010},
volume = {17},
doi = {10.37236/420},
zbl = {1204.05041},
url = {http://geodesic.mathdoc.fr/articles/10.37236/420/}
}
Gareth A. Jones; Daniel Pinto. Infinitely many hypermaps of a given type and genus. The electronic journal of combinatorics, Tome 17 (2010). doi: 10.37236/420
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