English

Orientable regular maps with Euler characteristic divisible by few primes

Group Theory 2014-02-26 v2

Abstract

Let GG be a (2,m,n)(2,m,n)-group and let xx be the number of distinct primes dividing χ\chi, the Euler characteristic of GG. We prove, first, that, apart from a finite number of known exceptions, a non-abelian simple composition factor TT of GG is a finite group of Lie type with rank nxn\leq x. This result is proved using new results connecting the prime graph of TT to the integer xx. We then study the particular cases x=1x=1 and x=2x=2. We give a general structure statement for (2,m,n)(2,m,n)-groups which have Euler characteristic a prime power, and we construct an infinite family of these objects. We also give a complete classification of those (2,m,n)(2,m,n)-groups which are almost simple and for which the Euler characteristic is a prime power (there are four such). Finally we study those (2,m,n)(2,m,n)-groups which are almost simple and for which the Euler characteristic is a product of two prime powers. All such groups which are not isomorphic to PSL2(q)PSL_2(q) or PGL2(q)PGL_2(q) are completely classified.

Keywords

Cite

@article{arxiv.1203.0138,
  title  = {Orientable regular maps with Euler characteristic divisible by few primes},
  author = {Nick Gill},
  journal= {arXiv preprint arXiv:1203.0138},
  year   = {2014}
}

Comments

21 pages. The second half of the previous version has been excised and will form a separate paper. I have also restated some lemmas

R2 v1 2026-06-21T20:27:29.662Z