On real and pseudo-real rational maps.

The moduli space Md, of complex rational maps of degree d ⩾ 2, is a connected complex orbifold which carries a natural real structure, coming from usual complex conjugation. Its real points are the classes of rational maps admitting antiholomorphic automorphisms. The locus of the real points decomposes as a disjoint union of the loci , consisting of the real rational maps, and , consisting of the pseudo-real ones. We obtain that, both and , are connected and that is disconnected. We also observe that the group of holomorphic automorphisms of a pseudo-real rational map is either trivial or a cyclic group. For every n ⩾ 1, we construct pseudo-real rational maps whose group of holomorphic automorphisms is cyclic of order n. As the field of moduli of a pseudo-real rational map is contained in , these maps provide examples of rational maps which are not definable over their field of moduli. It seems that these are the only explicit examples in the literature (Silverman) of rational maps which cannot be defined over their field of moduli. We provide explicit examples of real rational maps which cannot be defined over their field of moduli. Finally, we also observe that every real rational map, which admits a model over the algebraic numbers, can be defined over the real algebraic numbers. [ABSTRACT FROM AUTHOR]