Automorphism Groups of Cyclic p-gonal Pseudo-real Riemann Surfaces

Abstract

In this article we prove that the full automorphism group of a cyclic p-gonal pseudo-real Riemann surface of genus g is either a semidirect product Cn Cp or a cyclic group, where p is a prime >2 and g>(p-1)2. We obtain necessary and sufficient conditions for the existence of a cyclic p-gonal pseudo-real Riemann surface with full\ automorphism group isomorphic to a given finite group. Finally we describe some families of cyclic p-gonal pseudo-real Riemann surfaces where the order of the full automorphism group is maximal and show that such families determine some real 2-manifolds embbeded in the branch locus of moduli space.