Regularity properties of Macbeath-Hurwitz and related maps and surfaces

Abstract

The Macbeath-Hurwitz maps M of type \3,7\, obtained from the Hurwitz groups G= PSL2(q) found by Macbeath, are fully regular by a result of Singerman, with automorphism group G× C2 or PGL2(q). Hall's criterion determines which of these two properties, called inner and outer regularity, M has. Inner (but not outer) regular maps M yield non-orientable regular maps M/ C2 of the same type with automorphism group G. If q=p3 for a prime p 2 or 3 mod~(7) the unique map M is inner regular if and only if p 1 mod~(4). If q=p for a prime p 1 mod~(7) there are three maps M; we use the density theorems of Frobenius and Chebotarev to show that in this case the sets of such primes p for which 0, 1, 2 or 3 of them are inner regular have relative densities 1/8, 3/8, 3/8 and 1/8 respectively. Hall's criterion and its consequences are extended to the analogous Macbeath maps of type \3,n\ obtained from PSL2(q) for all n 7; theoretical predictions on their number and properties are supported by evidence from the map databases of Conder and Poto cnik.