Orientably-Regular p-Maps and Regular p-Maps

Abstract

A map is called a p-map if it has a prime p-power vertices. An orientably-regular (resp. A regular ) p-map is called solvable if the group G+ of all orientation-preserving automorphisms (resp. the group G of automorphisms) is solvable; and called normal if G+ (resp. G) contains the normal Sylow p-subgroup. In this paper, it will be proved that both orientably-regular p-maps and regular p-maps are solvable and except for few cases that p∈ \2, 3\, they are normal. Moreover, nonnormal p-maps will be characterized and some properties and constructions of normal p-maps will be given.