On the connectedness of the set of Riemann surfaces with real moduli

Abstract

The moduli space Mg, of genus g≥2 closed Riemann surfaces, is a complex orbifold of dimension 3(g-1) which carries a natural real structure i.e. it admits an anti-holomorphic involution σ. The involution σ maps each point corresponding to a Riemann surface S to its complex conjugate S. The fixed point set of σ consists of the isomorphism classes of closed Riemann surfaces admitting an anticonformal automorphism. Inside Fix(σ) is the locus Mg(R), the set of real Riemann surfaces, which is known to be connected by results due to P. Buser, M. Sepp\"al\"a and R. Silhol. The complement Fix(σ)-Mg(R) consists of the so called pseudo-real Riemann surfaces, which is known to be non-connected. In this short note we provide a simple argument to observe that Fix(σ) is connected.