Regular incidence quasi-polytopes and regular maps (Q1123400)

At first the author defines the incidence quasi-polytope P, to which a graph G(P) is associated; successively he proves that, if such a graph is the Cayley graph of some group, then P is regular. This procedure allows to construct a finite map of type \(\{\) \({\mathfrak a},{\mathfrak b}\}\) for all \({\mathfrak a}\) and \({\mathfrak b}\) and infinitely many such maps when \({\mathfrak a}\) or \({\mathfrak b}\) is divisible by 4 and both are greater than or equal to 4.