A class of pseudoreal Riemann surfaces with diagonal automorphism group

Abstract

A Riemann surface S having field of moduli R, but not a field of definition, is called pseudoreal. This means that S has anticonformal automorphisms, but non of them is an involution. We call a Riemann surface S plane if it can be described by a smooth plane model of some degree d≥4 in P2C. We characterize pseudoreal-plane Riemann surfaces S, whose conformal automorphism group Aut+(S) is PGL3(C)-conjugate to a finite non-trivial group G that leaves invariant infinitely many points of P2C. In particular, we show that such pseudoreal-plane Riemann surfaces exist only if Aut+(S) is cyclic of even order n dividing the degree d. Explicit examples are given, for any degree d=2pm with m>1 odd, p is prime and n=d/p.